Name | BinPacking/BinPacking-sum-skj1/ BinPacking-sum-n3c3w4h.xml |
MD5SUM | 797cc29f939b3426dc93651349e66756 |
Bench Category | COP (optimization problem) |
Best result obtained on this benchmark | SAT TO |
Best value of the objective obtained on this benchmark | 33 |
Best CPU time to get the best result obtained on this benchmark | 2002.48 |
Satisfiable | |
(Un)Satisfiability was proved | |
Number of variables | 473 |
Number of constraints | 239 |
Number of domains | 2 |
Minimum domain size | 67 |
Maximum domain size | 119 |
Distribution of domain sizes | [{"size":67,"count":472},{"size":119,"count":1}] |
Minimum variable degree | 2 |
Maximum variable degree | 5 |
Distribution of variable degrees | [{"degree":2,"count":1},{"degree":4,"count":354},{"degree":5,"count":118}] |
Minimum constraint arity | 4 |
Maximum constraint arity | 472 |
Distribution of constraint arities | [{"arity":4,"count":236},{"arity":119,"count":1},{"arity":472,"count":2}] |
Number of extensional constraints | 0 |
Number of intensional constraints | 0 |
Distribution of constraint types | [{"type":"ordered","count":118},{"type":"lex","count":1},{"type":"sum","count":118},{"type":"count","count":1},{"type":"cardinality","count":1}] |
Optimization problem | YES |
Type of objective | max VAR |
This section presents information obtained from the best job displayed in the list (i.e. solvers whose names are not hidden).
objective function: 33<instantiation> <list>x b[0][0] b[0][1] b[0][2] b[0][3] b[1][0] b[1][1] b[1][2] b[1][3] b[2][0] b[2][1] b[2][2] b[2][3] b[3][0] b[3][1] b[3][2] b[3][3] b[4][0] b[4][1] b[4][2] b[4][3] b[5][0] b[5][1] b[5][2] b[5][3] b[6][0] b[6][1] b[6][2] b[6][3] b[7][0] b[7][1] b[7][2] b[7][3] b[8][0] b[8][1] b[8][2] b[8][3] b[9][0] b[9][1] b[9][2] b[9][3] b[10][0] b[10][1] b[10][2] b[10][3] b[11][0] b[11][1] b[11][2] b[11][3] b[12][0] b[12][1] b[12][2] b[12][3] b[13][0] b[13][1] b[13][2] b[13][3] b[14][0] b[14][1] b[14][2] b[14][3] b[15][0] b[15][1] b[15][2] b[15][3] b[16][0] b[16][1] b[16][2] b[16][3] b[17][0] b[17][1] b[17][2] b[17][3] b[18][0] b[18][1] b[18][2] b[18][3] b[19][0] b[19][1] b[19][2] b[19][3] b[20][0] b[20][1] b[20][2] b[20][3] b[21][0] b[21][1] b[21][2] b[21][3] b[22][0] b[22][1] b[22][2] b[22][3] b[23][0] b[23][1] b[23][2] b[23][3] b[24][0] b[24][1] b[24][2] b[24][3] b[25][0] b[25][1] b[25][2] b[25][3] b[26][0] b[26][1] b[26][2] b[26][3] b[27][0] b[27][1] b[27][2] b[27][3] b[28][0] b[28][1] b[28][2] b[28][3] b[29][0] b[29][1] b[29][2] b[29][3] b[30][0] b[30][1] b[30][2] b[30][3] b[31][0] b[31][1] b[31][2] b[31][3] b[32][0] b[32][1] b[32][2] b[32][3] b[33][0] b[33][1] b[33][2] b[33][3] b[34][0] b[34][1] b[34][2] b[34][3] b[35][0] b[35][1] b[35][2] b[35][3] b[36][0] b[36][1] b[36][2] b[36][3] b[37][0] b[37][1] b[37][2] b[37][3] b[38][0] b[38][1] b[38][2] b[38][3] b[39][0] b[39][1] b[39][2] b[39][3] b[40][0] b[40][1] b[40][2] b[40][3] b[41][0] b[41][1] b[41][2] b[41][3] b[42][0] b[42][1] b[42][2] b[42][3] b[43][0] b[43][1] b[43][2] b[43][3] b[44][0] b[44][1] b[44][2] b[44][3] b[45][0] b[45][1] b[45][2] b[45][3] b[46][0] b[46][1] b[46][2] b[46][3] b[47][0] b[47][1] b[47][2] b[47][3] b[48][0] b[48][1] b[48][2] b[48][3] b[49][0] b[49][1] b[49][2] b[49][3] b[50][0] b[50][1] b[50][2] b[50][3] b[51][0] b[51][1] b[51][2] b[51][3] b[52][0] b[52][1] b[52][2] b[52][3] b[53][0] b[53][1] b[53][2] b[53][3] b[54][0] b[54][1] b[54][2] b[54][3] b[55][0] b[55][1] b[55][2] b[55][3] b[56][0] b[56][1] b[56][2] b[56][3] b[57][0] b[57][1] b[57][2] b[57][3] b[58][0] b[58][1] b[58][2] b[58][3] b[59][0] b[59][1] b[59][2] b[59][3] b[60][0] b[60][1] b[60][2] b[60][3] b[61][0] b[61][1] b[61][2] b[61][3] b[62][0] b[62][1] b[62][2] b[62][3] b[63][0] b[63][1] b[63][2] b[63][3] b[64][0] b[64][1] b[64][2] b[64][3] b[65][0] b[65][1] b[65][2] b[65][3] b[66][0] b[66][1] b[66][2] b[66][3] b[67][0] b[67][1] b[67][2] b[67][3] b[68][0] b[68][1] b[68][2] b[68][3] b[69][0] b[69][1] b[69][2] b[69][3] b[70][0] b[70][1] b[70][2] b[70][3] b[71][0] b[71][1] b[71][2] b[71][3] b[72][0] b[72][1] b[72][2] b[72][3] b[73][0] b[73][1] b[73][2] b[73][3] b[74][0] b[74][1] b[74][2] b[74][3] b[75][0] b[75][1] b[75][2] b[75][3] b[76][0] b[76][1] b[76][2] b[76][3] b[77][0] b[77][1] b[77][2] b[77][3] b[78][0] b[78][1] b[78][2] b[78][3] b[79][0] b[79][1] b[79][2] b[79][3] b[80][0] b[80][1] b[80][2] b[80][3] b[81][0] b[81][1] b[81][2] b[81][3] b[82][0] b[82][1] b[82][2] b[82][3] b[83][0] b[83][1] b[83][2] b[83][3] b[84][0] b[84][1] b[84][2] b[84][3] b[85][0] b[85][1] b[85][2] b[85][3] b[86][0] b[86][1] b[86][2] b[86][3] b[87][0] b[87][1] b[87][2] b[87][3] b[88][0] b[88][1] b[88][2] b[88][3] b[89][0] b[89][1] b[89][2] b[89][3] b[90][0] b[90][1] b[90][2] b[90][3] b[91][0] b[91][1] b[91][2] b[91][3] b[92][0] b[92][1] b[92][2] b[92][3] b[93][0] b[93][1] b[93][2] b[93][3] b[94][0] b[94][1] b[94][2] b[94][3] b[95][0] b[95][1] b[95][2] b[95][3] b[96][0] b[96][1] b[96][2] b[96][3] b[97][0] b[97][1] b[97][2] b[97][3] b[98][0] b[98][1] b[98][2] b[98][3] b[99][0] b[99][1] b[99][2] b[99][3] b[100][0] b[100][1] b[100][2] b[100][3] b[101][0] b[101][1] b[101][2] b[101][3] b[102][0] b[102][1] b[102][2] b[102][3] b[103][0] b[103][1] b[103][2] b[103][3] b[104][0] b[104][1] b[104][2] b[104][3] b[105][0] b[105][1] b[105][2] b[105][3] b[106][0] b[106][1] b[106][2] b[106][3] b[107][0] b[107][1] b[107][2] b[107][3] b[108][0] b[108][1] b[108][2] b[108][3] b[109][0] b[109][1] b[109][2] b[109][3] b[110][0] b[110][1] b[110][2] b[110][3] b[111][0] b[111][1] b[111][2] b[111][3] b[112][0] b[112][1] b[112][2] b[112][3] b[113][0] b[113][1] b[113][2] b[113][3] b[114][0] b[114][1] b[114][2] b[114][3] b[115][0] b[115][1] b[115][2] b[115][3] b[116][0] b[116][1] b[116][2] b[116][3] b[117][0] b[117][1] b[117][2] b[117][3] </list> <values>33 100 50 0 0 99 51 0 0 99 51 0 0 99 51 0 0 97 53 0 0 97 53 0 0 96 54 0 0 95 55 0 0 95 55 0 0 94 56 0 0 94 56 0 0 94 56 0 0 94 56 0 0 93 57 0 0 92 58 0 0 92 58 0 0 92 57 0 0 92 57 0 0 92 56 0 0 92 55 0 0 92 55 0 0 91 54 0 0 91 53 0 0 91 53 0 0 91 53 0 0 90 60 0 0 90 60 0 0 89 61 0 0 89 61 0 0 89 61 0 0 89 61 0 0 88 62 0 0 87 63 0 0 87 63 0 0 86 64 0 0 86 63 0 0 86 62 0 0 85 65 0 0 85 65 0 0 85 62 0 0 84 66 0 0 84 66 0 0 84 66 0 0 83 67 0 0 83 67 0 0 83 67 0 0 82 68 0 0 82 68 0 0 82 62 0 0 82 62 0 0 81 60 0 0 81 60 0 0 81 60 0 0 81 60 0 0 79 71 0 0 79 71 0 0 77 73 0 0 77 72 0 0 76 74 0 0 76 74 0 0 76 74 0 0 76 74 0 0 75 75 0 0 70 70 0 0 60 52 38 0 52 52 46 0 52 52 46 0 51 51 48 0 51 50 49 0 50 50 49 0 49 48 48 0 48 48 47 0 47 47 47 0 45 45 45 0 44 44 44 0 43 43 43 0 42 42 36 30 42 38 37 33 41 37 37 35 40 37 37 36 40 35 35 35 39 35 34 34 39 34 34 33 39 33 32 31 39 31 30 30 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 </values> </instantiation>