Name | CrosswordDesign/ CrosswordDesign-11-4-rom_c18.xml |
MD5SUM | 63b9378ece2d6066ad6e61da47f93b8a |
Bench Category | COP (optimization problem) |
Best result obtained on this benchmark | SAT |
Best value of the objective obtained on this benchmark | 65 |
Best CPU time to get the best result obtained on this benchmark | 2520.09 |
Satisfiable | |
(Un)Satisfiability was proved | |
Number of variables | 385 |
Number of constraints | 88 |
Number of domains | 5 |
Minimum domain size | 2 |
Maximum domain size | 115571 |
Distribution of domain sizes | [{"size":2,"count":22},{"size":12,"count":154},{"size":27,"count":121},{"size":115571,"count":88}] |
Minimum variable degree | 1 |
Maximum variable degree | 8 |
Distribution of variable degrees | [{"degree":1,"count":110},{"degree":2,"count":154},{"degree":8,"count":121}] |
Minimum constraint arity | 14 |
Maximum constraint arity | 15 |
Distribution of constraint arities | [{"arity":14,"count":22},{"arity":15,"count":66}] |
Number of extensional constraints | 88 |
Number of intensional constraints | 0 |
Distribution of constraint types | [{"type":"extension","count":88}] |
Optimization problem | YES |
Type of objective | max SUM |
Solver Name | TraceID | Answer | objective function | CPU time | Wall clock time |
---|---|---|---|---|---|
cosoco 1.12 (complete) | 4299251 | SAT (TO) | 65 | 2520.09 | 2519.9 |
GG's minicp 2018-04-29 (complete) | 4299252 | ? | 26.7232 | 10.4005 | |
slowpoke 2018-04-29 (incomplete) | 4299254 | ? | 33.5092 | 11.8733 | |
The dodo solver 2018-04-29 (complete) | 4299257 | ? | 36.6929 | 13.7829 | |
MiniCPFever 2018-04-29 (complete) | 4299253 | ? | 52.8445 | 18.9899 | |
SuperSolver_Macq_Stevenart 2018-04-27 (incomplete) | 4299256 | ? | 57.3154 | 19.8944 | |
Solver of Xavier Schul & Yvhan Smal 2018-04-28 (incomplete) | 4299255 | ? | 67.1273 | 24.6987 |
This section presents information obtained from the best job displayed in the list (i.e. solvers whose names are not hidden).
objective function: 65<instantiation type='solution' cost='65'> <list>bc[0][0] bc[0][1] bc[0][2] bc[0][3] bc[10][0] bc[10][1] bc[10][2] bc[10][3] bc[1][0] bc[1][1] bc[1][2] bc[1][3] bc[2][0] bc[2][1] bc[2][2] bc[2][3] bc[3][0] bc[3][1] bc[3][2] bc[3][3] bc[4][0] bc[4][1] bc[4][2] bc[4][3] bc[5][0] bc[5][1] bc[5][2] bc[5][3] bc[6][0] bc[6][1] bc[6][2] bc[6][3] bc[7][0] bc[7][1] bc[7][2] bc[7][3] bc[8][0] bc[8][1] bc[8][2] bc[8][3] bc[9][0] bc[9][1] bc[9][2] bc[9][3] br[0][0] br[0][1] br[0][2] br[0][3] br[10][0] br[10][1] br[10][2] br[10][3] br[1][0] br[1][1] br[1][2] br[1][3] br[2][0] br[2][1] br[2][2] br[2][3] br[3][0] br[3][1] br[3][2] br[3][3] br[4][0] br[4][1] br[4][2] br[4][3] br[5][0] br[5][1] br[5][2] br[5][3] br[6][0] br[6][1] br[6][2] br[6][3] br[7][0] br[7][1] br[7][2] br[7][3] br[8][0] br[8][1] br[8][2] br[8][3] br[9][0] br[9][1] br[9][2] br[9][3] c[0][0] c[0][1] c[0][2] c[0][3] c[10][0] c[10][1] c[10][2] c[10][3] c[1][0] c[1][1] c[1][2] c[1][3] c[2][0] c[2][1] c[2][2] c[2][3] c[3][0] c[3][1] c[3][2] c[3][3] c[4][0] c[4][1] c[4][2] c[4][3] c[5][0] c[5][1] c[5][2] c[5][3] c[6][0] c[6][1] c[6][2] c[6][3] c[7][0] c[7][1] c[7][2] c[7][3] c[8][0] c[8][1] c[8][2] c[8][3] c[9][0] c[9][1] c[9][2] c[9][3] pc[0][0] pc[0][1] pc[0][2] pc[0][3] pc[10][0] pc[10][1] pc[10][2] pc[10][3] pc[1][0] pc[1][1] pc[1][2] pc[1][3] pc[2][0] pc[2][1] pc[2][2] pc[2][3] pc[3][0] pc[3][1] pc[3][2] pc[3][3] pc[4][0] pc[4][1] pc[4][2] pc[4][3] pc[5][0] pc[5][1] pc[5][2] pc[5][3] pc[6][0] pc[6][1] pc[6][2] pc[6][3] pc[7][0] pc[7][1] pc[7][2] pc[7][3] pc[8][0] pc[8][1] pc[8][2] pc[8][3] pc[9][0] pc[9][1] pc[9][2] pc[9][3] pr[0][0] pr[0][1] pr[0][2] pr[0][3] pr[10][0] pr[10][1] pr[10][2] pr[10][3] pr[1][0] pr[1][1] pr[1][2] pr[1][3] pr[2][0] pr[2][1] pr[2][2] pr[2][3] pr[3][0] pr[3][1] pr[3][2] pr[3][3] pr[4][0] pr[4][1] pr[4][2] pr[4][3] pr[5][0] pr[5][1] pr[5][2] pr[5][3] pr[6][0] pr[6][1] pr[6][2] pr[6][3] pr[7][0] pr[7][1] pr[7][2] pr[7][3] pr[8][0] pr[8][1] pr[8][2] pr[8][3] pr[9][0] pr[9][1] pr[9][2] pr[9][3] r[0][0] r[0][1] r[0][2] r[0][3] r[10][0] r[10][1] r[10][2] r[10][3] r[1][0] r[1][1] r[1][2] r[1][3] r[2][0] r[2][1] r[2][2] r[2][3] r[3][0] r[3][1] r[3][2] r[3][3] r[4][0] r[4][1] r[4][2] r[4][3] r[5][0] r[5][1] r[5][2] r[5][3] r[6][0] r[6][1] r[6][2] r[6][3] r[7][0] r[7][1] r[7][2] r[7][3] r[8][0] r[8][1] r[8][2] r[8][3] r[9][0] r[9][1] r[9][2] r[9][3] x[0][0] x[0][10] x[0][1] x[0][2] x[0][3] x[0][4] x[0][5] x[0][6] x[0][7] x[0][8] x[0][9] x[10][0] x[10][10] x[10][1] x[10][2] x[10][3] x[10][4] x[10][5] x[10][6] x[10][7] x[10][8] x[10][9] x[1][0] x[1][10] x[1][1] x[1][2] x[1][3] x[1][4] x[1][5] x[1][6] x[1][7] x[1][8] x[1][9] x[2][0] x[2][10] x[2][1] x[2][2] x[2][3] x[2][4] x[2][5] x[2][6] x[2][7] x[2][8] x[2][9] x[3][0] x[3][10] x[3][1] x[3][2] x[3][3] x[3][4] x[3][5] x[3][6] x[3][7] x[3][8] x[3][9] x[4][0] x[4][10] x[4][1] x[4][2] x[4][3] x[4][4] x[4][5] x[4][6] x[4][7] x[4][8] x[4][9] x[5][0] x[5][10] x[5][1] x[5][2] x[5][3] x[5][4] x[5][5] x[5][6] x[5][7] x[5][8] x[5][9] x[6][0] x[6][10] x[6][1] x[6][2] x[6][3] x[6][4] x[6][5] x[6][6] x[6][7] x[6][8] x[6][9] x[7][0] x[7][10] x[7][1] x[7][2] x[7][3] x[7][4] x[7][5] x[7][6] x[7][7] x[7][8] x[7][9] x[8][0] x[8][10] x[8][1] x[8][2] x[8][3] x[8][4] x[8][5] x[8][6] x[8][7] x[8][8] x[8][9] x[9][0] x[9][10] x[9][1] x[9][2] x[9][3] x[9][4] x[9][5] x[9][6] x[9][7] x[9][8] x[9][9] </list> <values>0 9 0 0 0 0 0 0 0 0 0 0 9 0 0 0 8 0 0 0 0 0 0 0 0 0 0 0 7 0 0 0 0 0 0 0 0 0 0 0 7 0 0 0 0 0 0 0 0 8 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 8 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 9 0 0 0 110958 -1 -1 32569 73756 1 -1 6 109129 1102 8506 7773 -1 -1 -1 2514 109171 -1 -1 13438 46864 32952 2296 71052 5861 90588 -1 66674 72470 -1 -1 103096 32531 105489 -1 7 0 16771 -1 86553 106463 -1 -1 0 2 -1 -1 0 3 9 -1 0 3 5 8 1 -1 -1 -1 0 9 -1 -1 0 3 5 8 0 4 7 -1 0 8 -1 -1 0 2 5 -1 0 4 6 -1 0 8 -1 -1 0 3 -1 -1 0 3 -1 -1 1 8 -1 -1 0 2 5 -1 0 6 9 -1 0 2 5 8 0 9 -1 -1 0 6 -1 -1 0 2 5 7 0 4 -1 -1 0 2 -1 -1 1 715 -1 -1 85994 32309 -1 -1 8797 8506 -1 -1 110538 109131 6104 -1 7759 110539 34083 -1 66229 107072 1 2296 15898 41441 -1 -1 71057 114715 -1 -1 109129 58306 85993 87599 110683 42386 -1 -1 32530 7773 -1 -1 0 4 0 26 0 2 14 13 19 0 17 17 0 0 26 3 20 12 1 17 0 21 26 2 1 0 11 0 3 0 26 1 0 21 26 26 20 1 26 0 17 4 0 11 0 15 20 18 4 8 26 21 0 26 4 13 0 26 19 17 26 0 0 26 0 8 2 2 0 17 19 4 17 4 19 26 6 14 4 3 0 8 4 26 25 4 2 7 20 0 26 11 18 26 17 26 17 4 26 21 26 0 8 26 6 8 14 13 0 19 4 0 26 0 20 18 19 17 0 11 8 </values> </instantiation>