Name | GraphColoring/GraphColoring-m1-mono/ GraphColoring-fpsol2-i-1.xml |
MD5SUM | eb626c86eebc9610b3d9f58ff910c3c8 |
Bench Category | COP (optimization problem) |
Best result obtained on this benchmark | SAT TO |
Best value of the objective obtained on this benchmark | 64 |
Best CPU time to get the best result obtained on this benchmark | 2400.02 |
Satisfiable | |
(Un)Satisfiability was proved | |
Number of variables | 496 |
Number of constraints | 11654 |
Number of domains | 1 |
Minimum domain size | 496 |
Maximum domain size | 496 |
Distribution of domain sizes | [{"size":496,"count":496}] |
Minimum variable degree | 1 |
Maximum variable degree | 253 |
Distribution of variable degrees | [{"degree":1,"count":227},{"degree":27,"count":8},{"degree":28,"count":11},{"degree":29,"count":4},{"degree":30,"count":3},{"degree":31,"count":1},{"degree":35,"count":1},{"degree":40,"count":1},{"degree":42,"count":2},{"degree":43,"count":1},{"degree":44,"count":3},{"degree":45,"count":3},{"degree":47,"count":1},{"degree":48,"count":3},{"degree":49,"count":6},{"degree":50,"count":4},{"degree":51,"count":3},{"degree":52,"count":6},{"degree":53,"count":9},{"degree":54,"count":7},{"degree":55,"count":3},{"degree":56,"count":9},{"degree":57,"count":10},{"degree":58,"count":4},{"degree":59,"count":6},"...",{"degree":112,"count":3}, {"degree":118,"count":1}, {"degree":119,"count":1}, {"degree":120,"count":1}, {"degree":131,"count":1}, {"degree":134,"count":1}, {"degree":189,"count":2}, {"degree":191,"count":2}, {"degree":211,"count":6}, {"degree":216,"count":1}, {"degree":217,"count":1}, {"degree":218,"count":1}, {"degree":219,"count":2}, {"degree":220,"count":1}, {"degree":221,"count":1}, {"degree":222,"count":1}, {"degree":223,"count":1}, {"degree":224,"count":10}, {"degree":225,"count":7}, {"degree":226,"count":1}, {"degree":227,"count":1}, {"degree":228,"count":1}, {"degree":229,"count":1}, {"degree":230,"count":1}, {"degree":253,"count":3}] |
Minimum constraint arity | 2 |
Maximum constraint arity | 2 |
Distribution of constraint arities | [{"arity":2,"count":11654}] |
Number of extensional constraints | 0 |
Number of intensional constraints | 11654 |
Distribution of constraint types | [{"type":"intension","count":11654}] |
Optimization problem | YES |
Type of objective | min MAXIMUM |
Solver Name | TraceID | Answer | objective function | CPU time | Wall clock time |
---|---|---|---|---|---|
cosoco 2.0 (complete) | 4408853 | SAT (TO) | 64 | 2400.02 | 2400.11 |
cosoco 2 (complete) | 4394671 | SAT (TO) | 64 | 2400.08 | 2400.3 |
cosoco 2.0 (complete) | 4397593 | SAT (TO) | 64 | 2400.09 | 2400.2 |
(reference) PicatSAT 2019-09-12 (complete) | 4407538 | ? (TO) | 2400.03 | 2400.2 |
This section presents information obtained from the best job displayed in the list (i.e. solvers whose names are not hidden).
objective function: 64<instantiation type='solution' cost='64'> <list>x[0] x[100] x[101] x[102] x[103] x[104] x[105] x[106] x[107] x[108] x[109] x[10] x[110] x[111] x[112] x[113] x[114] x[115] x[116] x[117] x[118] x[119] x[11] x[120] x[121] x[122] x[123] x[124] x[125] x[126] x[127] x[128] x[129] x[12] x[130] x[131] x[132] x[133] x[134] x[135] x[136] x[137] x[138] x[139] x[13] x[140] x[141] x[142] x[143] x[144] x[145] x[146] x[147] x[148] x[149] x[14] x[150] x[151] x[152] x[153] x[154] x[155] x[156] x[157] x[158] x[159] x[15] x[160] x[161] x[162] x[163] x[164] x[165] x[166] x[167] x[168] x[169] x[16] x[170] x[171] x[172] x[173] x[174] x[175] x[176] x[177] x[178] x[179] x[17] x[180] x[181] x[182] x[183] x[184] x[185] x[186] x[187] x[188] x[189] x[18] x[190] x[191] x[192] x[193] x[194] x[195] x[196] x[197] x[198] x[199] x[19] x[1] x[200] x[201] x[202] x[203] x[204] x[205] x[206] x[207] x[208] x[209] x[20] x[210] x[211] x[212] x[213] x[214] x[215] x[216] x[217] x[218] x[219] x[21] x[220] x[221] x[222] x[223] x[224] x[225] x[226] x[227] x[228] x[229] x[22] x[230] x[231] x[232] x[233] x[234] x[235] x[236] x[237] x[238] x[239] x[23] x[240] x[241] x[242] x[243] x[244] x[245] x[246] x[247] x[248] x[249] x[24] x[250] x[251] x[252] x[253] x[254] x[255] x[256] x[257] x[258] x[259] x[25] x[260] x[261] x[262] x[263] x[264] x[265] x[266] x[267] x[268] x[269] x[26] x[270] x[271] x[272] x[273] x[274] x[275] x[276] x[277] x[278] x[279] x[27] x[280] x[281] x[282] x[283] x[284] x[285] x[286] x[287] x[288] x[289] x[28] x[290] x[291] x[292] x[293] x[294] x[295] x[296] x[297] x[298] x[299] x[29] x[2] x[300] x[301] x[302] x[303] x[304] x[305] x[306] x[307] x[308] x[309] x[30] x[310] x[311] x[312] x[313] x[314] x[315] x[316] x[317] x[318] x[319] x[31] x[320] x[321] x[322] x[323] x[324] x[325] x[326] x[327] x[328] x[329] x[32] x[330] x[331] x[332] x[333] x[334] x[335] x[336] x[337] x[338] x[339] x[33] x[340] x[341] x[342] x[343] x[344] x[345] x[346] x[347] x[348] x[349] x[34] x[350] x[351] x[352] x[353] x[354] x[355] x[356] x[357] x[358] x[359] x[35] x[360] x[361] x[362] x[363] x[364] x[365] x[366] x[367] x[368] x[369] x[36] x[370] x[371] x[372] x[373] x[374] x[375] x[376] x[377] x[378] x[379] x[37] x[380] x[381] x[382] x[383] x[384] x[385] x[386] x[387] x[388] x[389] x[38] x[390] x[391] x[392] x[393] x[394] x[395] x[396] x[397] x[398] x[399] x[39] x[3] x[400] x[401] x[402] x[403] x[404] x[405] x[406] x[407] x[408] x[409] x[40] x[410] x[411] x[412] x[413] x[414] x[415] x[416] x[417] x[418] x[419] x[41] x[420] x[421] x[422] x[423] x[424] x[425] x[426] x[427] x[428] x[429] x[42] x[430] x[431] x[432] x[433] x[434] x[435] x[436] x[437] x[438] x[439] x[43] x[440] x[441] x[442] x[443] x[444] x[445] x[446] x[447] x[448] x[449] x[44] x[450] x[451] x[452] x[453] x[454] x[455] x[456] x[457] x[458] x[459] x[45] x[460] x[461] x[462] x[463] x[464] x[465] x[466] x[467] x[468] x[469] x[46] x[470] x[471] x[472] x[473] x[474] x[475] x[476] x[477] x[478] x[479] x[47] x[480] x[481] x[482] x[483] x[484] x[485] x[486] x[487] x[488] x[489] x[48] x[490] x[491] x[492] x[493] x[494] x[495] x[49] x[4] x[50] x[51] x[52] x[53] x[54] x[55] x[56] x[57] x[58] x[59] x[5] x[60] x[61] x[62] x[63] x[64] x[65] x[66] x[67] x[68] x[69] x[6] x[70] x[71] x[72] x[73] x[74] x[75] x[76] x[77] x[78] x[79] x[7] x[80] x[81] x[82] x[83] x[84] x[85] x[86] x[87] x[88] x[89] x[8] x[90] x[91] x[92] x[93] x[94] x[95] x[96] x[97] x[98] x[99] x[9] </list> <values>0 7 8 9 11 12 13 20 21 0 22 3 0 0 23 24 0 25 26 0 27 28 36 29 30 31 32 33 0 0 0 6 7 4 0 1 0 0 0 5 11 8 0 0 10 9 0 0 0 5 0 34 0 11 34 37 35 0 0 0 0 5 0 0 50 51 38 52 0 19 0 0 53 0 34 0 1 0 35 1 0 0 0 0 0 0 0 0 2 0 50 51 0 1 0 0 0 1 1 36 0 0 0 0 0 0 1 0 0 11 37 2 52 0 53 11 0 0 0 0 0 0 38 0 0 11 54 0 20 0 54 52 53 39 11 11 53 11 55 54 0 52 0 53 40 0 11 0 55 0 56 0 53 54 55 41 56 57 0 24 19 24 0 25 19 19 42 24 19 0 0 58 0 0 10 55 0 43 54 10 55 56 10 0 54 0 10 0 44 55 0 56 0 55 56 57 0 19 20 45 20 19 19 0 0 58 0 0 0 0 46 0 0 0 0 0 9 8 0 4 0 47 14 0 1 7 0 5 0 0 1 0 1 48 0 0 10 0 11 0 19 19 0 0 49 10 0 0 0 51 0 53 1 54 0 3 1 0 55 0 0 56 0 57 59 1 0 0 0 1 1 0 0 0 0 0 0 0 1 0 0 0 1 0 0 1 0 58 0 0 0 0 10 0 52 0 1 0 0 0 0 0 0 0 0 0 0 0 1 1 3 0 0 1 10 0 1 0 10 0 10 0 60 0 20 19 19 0 0 61 0 0 0 21 6 6 0 61 6 0 60 0 6 0 0 10 62 63 0 64 0 0 0 0 0 0 64 0 19 0 0 19 0 0 0 0 1 61 0 1 7 0 1 0 50 0 0 7 60 0 7 0 1 0 0 0 1 0 6 10 7 0 19 0 0 1 0 1 7 8 0 7 7 0 11 0 7 0 10 8 4 7 0 20 19 19 0 0 50 0 1 0 0 6 6 6 0 11 0 6 0 7 0 6 0 19 0 0 1 4 22 0 0 0 0 5 0 0 0 8 0 23 0 7 11 20 0 10 6 0 0 0 15 0 0 0 9 0 4 50 52 1 4 16 5 10 11 10 1 27 58 6 52 12 17 13 14 15 16 17 18 19 1 5 6 18 </values> </instantiation>