2017 XCSP3 competition: fast COP track (sequential and parallel solvers): solvers results per benchmarks

Result page for benchmark
BinPacking/
BinPacking-tab-fu/BinPacking-tab-fu0120-17.xml

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General information on the benchmark

NameBinPacking/
BinPacking-tab-fu/BinPacking-tab-fu0120-17.xml
MD5SUM2f852f7efb9788b9c4f77f580498dd38
Bench CategoryCOP (optimization problem)
Best result obtained on this benchmarkSAT TO
Best value of the objective obtained on this benchmark22
Best CPU time to get the best result obtained on this benchmark251.89301
Satisfiable
(Un)Satisfiability was proved
Number of variables371
Number of constraints77
Number of domains2
Minimum domain size65
Maximum domain size75
Distribution of domain sizes[{"size":65,"count":370},{"size":75,"count":1}]
Minimum variable degree2
Maximum variable degree4
Distribution of variable degrees[{"degree":2,"count":1},{"degree":3,"count":296},{"degree":4,"count":74}]
Minimum constraint arity5
Maximum constraint arity370
Distribution of constraint arities[{"arity":5,"count":74},{"arity":75,"count":1},{"arity":370,"count":2}]
Number of extensional constraints74
Number of intensional constraints0
Distribution of constraint types[{"type":"extension","count":74},{"type":"lex","count":1},{"type":"count","count":1},{"type":"cardinality","count":1}]
Optimization problemYES
Type of objectivemax VAR

Results of the different solvers on this benchmark

Solver NameTraceIDAnswerobjective functionCPU timeWall clock time
Mistral-2.0 2017-07-28 (complete)4258908SAT (TO)22 251.89301 252.011
OscaR - Parallel with EPS 2017-07-26 (complete)4256920SAT (TO)22 1425.83 252.05099
AbsCon-basic 2017-06-11 (complete)4257417SAT (TO)21 244.633 240.01199
OscaR - Conflict Ordering 2017-07-26 (complete)4255926SAT (TO)21 244.642 240.036
OscaR - Hybrid 2017-07-26 (complete)4256423SAT (TO)21 249.298 240.024
OscaR - ALNS 2017-07-26 (complete)4255429SAT (TO)21 249.80099 240.02499
OscaR - Parallel with EPS 2017-08-22 (complete)4285694SAT (TO)21 1422.5601 252.075
cosoco-sat 1.12 (complete)4266603? (TO) 240.009 240.011
choco-solver 4.0.5 seq (2017-07-26) (complete)4253938? (TO) 245.34 240.00999
choco-solver 4.0.5 seq (2017-08-18) (complete)4282754? (TO) 245.481 240.02499
choco-solver 4.0.5 seq (2017-08-09) (complete)4270004? (TO) 245.608 240.02299
cosoco 1.12 (complete)4268534? (TO) 251.908 252.00999
cosoco 1.1 (complete)4258411? (TO) 251.946 252.00999
choco-solver 5a (2017-07-26) (complete)4254932? (TO) 253.28 240.00999
choco-solver 5a (2017-08-18) (complete)4284224? (TO) 253.379 240.02299
Concrete 3.4 (complete)4259405? (TO) 259.55701 240.483
sat4j-CSP 2017-07-05 (complete)4257914? (TO) 259.86301 103.454
choco-solver 4.0.5 par (2017-08-09) (complete)4271474? (TO) 1907.35 252.11
choco-solver 4.0.5 par (2017-08-18) (complete)4281284? (TO) 1907.61 252.11
choco-solver 4.0.5 par (2017-07-26) (complete)4254435? (TO) 1920.76 253.63499

Additionnal information

This section presents information obtained from the best job displayed in the list (i.e. solvers whose names are not hidden).

objective function: 22
Solution found:
<instantiation type="solution"> <list> x b[0][0] b[0][1] b[0][2] b[0][3] b[0][4] b[1][0] b[1][1] b[1][2] b[1][3] b[1][4] b[2][0] b[2][1]
b[2][2] b[2][3] b[2][4] b[3][0] b[3][1] b[3][2] b[3][3] b[3][4] b[4][0] b[4][1] b[4][2] b[4][3] b[4][4] b[5][0] b[5][1] b[5][2] b[5][3]
b[5][4] b[6][0] b[6][1] b[6][2] b[6][3] b[6][4] b[7][0] b[7][1] b[7][2] b[7][3] b[7][4] b[8][0] b[8][1] b[8][2] b[8][3] b[8][4] b[9][0]
b[9][1] b[9][2] b[9][3] b[9][4] b[10][0] b[10][1] b[10][2] b[10][3] b[10][4] b[11][0] b[11][1] b[11][2] b[11][3] b[11][4] b[12][0] b[12][1]
b[12][2] b[12][3] b[12][4] b[13][0] b[13][1] b[13][2] b[13][3] b[13][4] b[14][0] b[14][1] b[14][2] b[14][3] b[14][4] b[15][0] b[15][1]
b[15][2] b[15][3] b[15][4] b[16][0] b[16][1] b[16][2] b[16][3] b[16][4] b[17][0] b[17][1] b[17][2] b[17][3] b[17][4] b[18][0] b[18][1]
b[18][2] b[18][3] b[18][4] b[19][0] b[19][1] b[19][2] b[19][3] b[19][4] b[20][0] b[20][1] b[20][2] b[20][3] b[20][4] b[21][0] b[21][1]
b[21][2] b[21][3] b[21][4] b[22][0] b[22][1] b[22][2] b[22][3] b[22][4] b[23][0] b[23][1] b[23][2] b[23][3] b[23][4] b[24][0] b[24][1]
b[24][2] b[24][3] b[24][4] b[25][0] b[25][1] b[25][2] b[25][3] b[25][4] b[26][0] b[26][1] b[26][2] b[26][3] b[26][4] b[27][0] b[27][1]
b[27][2] b[27][3] b[27][4] b[28][0] b[28][1] b[28][2] b[28][3] b[28][4] b[29][0] b[29][1] b[29][2] b[29][3] b[29][4] b[30][0] b[30][1]
b[30][2] b[30][3] b[30][4] b[31][0] b[31][1] b[31][2] b[31][3] b[31][4] b[32][0] b[32][1] b[32][2] b[32][3] b[32][4] b[33][0] b[33][1]
b[33][2] b[33][3] b[33][4] b[34][0] b[34][1] b[34][2] b[34][3] b[34][4] b[35][0] b[35][1] b[35][2] b[35][3] b[35][4] b[36][0] b[36][1]
b[36][2] b[36][3] b[36][4] b[37][0] b[37][1] b[37][2] b[37][3] b[37][4] b[38][0] b[38][1] b[38][2] b[38][3] b[38][4] b[39][0] b[39][1]
b[39][2] b[39][3] b[39][4] b[40][0] b[40][1] b[40][2] b[40][3] b[40][4] b[41][0] b[41][1] b[41][2] b[41][3] b[41][4] b[42][0] b[42][1]
b[42][2] b[42][3] b[42][4] b[43][0] b[43][1] b[43][2] b[43][3] b[43][4] b[44][0] b[44][1] b[44][2] b[44][3] b[44][4] b[45][0] b[45][1]
b[45][2] b[45][3] b[45][4] b[46][0] b[46][1] b[46][2] b[46][3] b[46][4] b[47][0] b[47][1] b[47][2] b[47][3] b[47][4] b[48][0] b[48][1]
b[48][2] b[48][3] b[48][4] b[49][0] b[49][1] b[49][2] b[49][3] b[49][4] b[50][0] b[50][1] b[50][2] b[50][3] b[50][4] b[51][0] b[51][1]
b[51][2] b[51][3] b[51][4] b[52][0] b[52][1] b[52][2] b[52][3] b[52][4] b[53][0] b[53][1] b[53][2] b[53][3] b[53][4] b[54][0] b[54][1]
b[54][2] b[54][3] b[54][4] b[55][0] b[55][1] b[55][2] b[55][3] b[55][4] b[56][0] b[56][1] b[56][2] b[56][3] b[56][4] b[57][0] b[57][1]
b[57][2] b[57][3] b[57][4] b[58][0] b[58][1] b[58][2] b[58][3] b[58][4] b[59][0] b[59][1] b[59][2] b[59][3] b[59][4] b[60][0] b[60][1]
b[60][2] b[60][3] b[60][4] b[61][0] b[61][1] b[61][2] b[61][3] b[61][4] b[62][0] b[62][1] b[62][2] b[62][3] b[62][4] b[63][0] b[63][1]
b[63][2] b[63][3] b[63][4] b[64][0] b[64][1] b[64][2] b[64][3] b[64][4] b[65][0] b[65][1] b[65][2] b[65][3] b[65][4] b[66][0] b[66][1]
b[66][2] b[66][3] b[66][4] b[67][0] b[67][1] b[67][2] b[67][3] b[67][4] b[68][0] b[68][1] b[68][2] b[68][3] b[68][4] b[69][0] b[69][1]
b[69][2] b[69][3] b[69][4] b[70][0] b[70][1] b[70][2] b[70][3] b[70][4] b[71][0] b[71][1] b[71][2] b[71][3] b[71][4] b[72][0] b[72][1]
b[72][2] b[72][3] b[72][4] b[73][0] b[73][1] b[73][2] b[73][3] b[73][4] </list> <values> 22 100 50 0 0 0 100 47 0 0 0 100 47 0 0 0 99 51 0 0
0 98 51 0 0 0 95 55 0 0 0 95 53 0 0 0 94 56 0 0 0 94 56 0 0 0 93 54 0 0 0 92 58 0 0 0 92 58 0 0 0 91 37 22 0 0 91 31 28 0 0 90 30 30 0 0 90
30 29 0 0 89 61 0 0 0 89 61 0 0 0 88 60 0 0 0 88 59 0 0 0 87 62 0 0 0 86 64 0 0 0 86 63 0 0 0 86 63 0 0 0 86 38 26 0 0 86 34 30 0 0 85 65 0
0 0 85 62 0 0 0 85 39 26 0 0 84 42 22 0 0 84 41 0 0 0 83 37 30 0 0 82 40 27 0 0 80 70 0 0 0 80 69 0 0 0 80 68 0 0 0 79 71 0 0 0 79 69 0 0 0
79 68 0 0 0 79 60 0 0 0 78 72 0 0 0 77 73 0 0 0 77 72 0 0 0 77 72 0 0 0 76 74 0 0 0 74 72 0 0 0 56 45 43 0 0 55 53 42 0 0 55 44 43 0 0 53 53
44 0 0 51 51 48 0 0 49 49 46 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>