2018 XCSP3 competition: sequential solvers tracks: solvers results per benchmarks

Result page for benchmark
TravelingTournament/
TravelingTournament-a3-galaxy08_c18.xml

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General information on the benchmark

NameTravelingTournament/
TravelingTournament-a3-galaxy08_c18.xml
MD5SUM999d72664bbc4f113c6ae8b8cae55b16
Bench CategoryCOP (optimization problem)
Best result obtained on this benchmarkSAT
Best value of the objective obtained on this benchmark2888
Best CPU time to get the best result obtained on this benchmark2520.05
Satisfiable
(Un)Satisfiability was proved
Number of variables456
Number of constraints1111
Number of domains3
Minimum domain size2
Maximum domain size24
Distribution of domain sizes[{"size":2,"count":224},{"size":8,"count":112},{"size":24,"count":120}]
Minimum variable degree2
Maximum variable degree26
Distribution of variable degrees[{"degree":2,"count":232},{"degree":23,"count":96},{"degree":24,"count":112},{"degree":25,"count":14},{"degree":26,"count":2}]
Minimum constraint arity2
Maximum constraint arity14
Distribution of constraint arities[{"arity":2,"count":113},{"arity":3,"count":16},{"arity":4,"count":624},{"arity":5,"count":104},{"arity":8,"count":126},{"arity":10,"count":112},{"arity":14,"count":16}]
Number of extensional constraints120
Number of intensional constraints737
Distribution of constraint types[{"type":"extension","count":120},{"type":"intension","count":737},{"type":"regular","count":8},{"type":"allDifferent","count":14},{"type":"cardinality","count":8},{"type":"element","count":224}]
Optimization problemYES
Type of objectivemin SUM

Results of the different solvers on this benchmark

Solver NameTraceIDAnswerobjective functionCPU timeWall clock time
Mistral-2.0 2018-06-15 (complete)4289636SAT (TO)2673 2400.03 2400.01
Concrete 3.8 2018-06-13 (complete)4295429SAT (TO)2839 2520.1 2456.53
Concrete 3.9.2 (complete)4304701SAT (TO)2888 2520.05 2455.04
OscaR - Conflict Ordering with restarts 2018-07-02 (complete)4290305SAT (TO)2910 2400.08 2354.34
Concrete 3.9.2-SuperNG (complete)4304702SAT (TO)2922 2520.06 2471.53
Choco-solver 4.0.7 seq (493a269) (complete)4292261SAT (TO)2959 2400.08 2390.02
Choco-solver 4.0.7b seq (e747e1e) (complete)4306555SAT (TO)2959 2520.03 2509.61
Concrete 3.8-SuperNG 2018-06-13 (complete)4295430SAT (TO)2966 2520.1 2472.23
OscaR - Conflict Ordering with restarts 2018-08-14 (complete)4307849SAT (TO)3027 2520.12 2471.83
OscaR - Conflict Ordering with restarts 2018-08-17 (complete)4311585SAT (TO)3102 2520.05 2471.92
OscaR - Hybrid 2018-07-02 (complete)4291503SAT (TO)3131 2400.12 2363.63
OscaR - Hybrid 2018-08-14 (complete)4308435SAT (TO)3155 2520.08 2482.02
Sat4j-CSP 2018-07-11 (complete)4289818SAT (TO)3294 2400.25 2384.63
cosoco 1.12 (complete)4295431? (NS) 0.006832 0.00768011
PicatSAT 2018-06-15 (complete)4295432? (TO) 2519.75 2520.03
PicatSAT 2018-08-02 (complete)4303031? (TO) 2519.86 2520.01
PicatSAT 2018-08-14 (complete)4309371? (TO) 2520.04 2520.02
Mistral-2.0 2018-08-01 (complete)4303617Signal 0.385792 2.0903

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: 2673
Solution found:
<instantiation type="solution"> <list> o[0][0] o[0][1] o[0][2] o[0][3] o[0][4] o[0][5] o[0][6] o[0][7] o[0][8] o[0][9] o[0][10] o[0][11]
o[0][12] o[0][13] o[1][0] o[1][1] o[1][2] o[1][3] o[1][4] o[1][5] o[1][6] o[1][7] o[1][8] o[1][9] o[1][10] o[1][11] o[1][12] o[1][13]
o[2][0] o[2][1] o[2][2] o[2][3] o[2][4] o[2][5] o[2][6] o[2][7] o[2][8] o[2][9] o[2][10] o[2][11] o[2][12] o[2][13] o[3][0] o[3][1] o[3][2]
o[3][3] o[3][4] o[3][5] o[3][6] o[3][7] o[3][8] o[3][9] o[3][10] o[3][11] o[3][12] o[3][13] o[4][0] o[4][1] o[4][2] o[4][3] o[4][4] o[4][5]
o[4][6] o[4][7] o[4][8] o[4][9] o[4][10] o[4][11] o[4][12] o[4][13] o[5][0] o[5][1] o[5][2] o[5][3] o[5][4] o[5][5] o[5][6] o[5][7] o[5][8]
o[5][9] o[5][10] o[5][11] o[5][12] o[5][13] o[6][0] o[6][1] o[6][2] o[6][3] o[6][4] o[6][5] o[6][6] o[6][7] o[6][8] o[6][9] o[6][10]
o[6][11] o[6][12] o[6][13] o[7][0] o[7][1] o[7][2] o[7][3] o[7][4] o[7][5] o[7][6] o[7][7] o[7][8] o[7][9] o[7][10] o[7][11] o[7][12]
o[7][13] h[0][0] h[0][1] h[0][2] h[0][3] h[0][4] h[0][5] h[0][6] h[0][7] h[0][8] h[0][9] h[0][10] h[0][11] h[0][12] h[0][13] h[1][0] h[1][1]
h[1][2] h[1][3] h[1][4] h[1][5] h[1][6] h[1][7] h[1][8] h[1][9] h[1][10] h[1][11] h[1][12] h[1][13] h[2][0] h[2][1] h[2][2] h[2][3] h[2][4]
h[2][5] h[2][6] h[2][7] h[2][8] h[2][9] h[2][10] h[2][11] h[2][12] h[2][13] h[3][0] h[3][1] h[3][2] h[3][3] h[3][4] h[3][5] h[3][6] h[3][7]
h[3][8] h[3][9] h[3][10] h[3][11] h[3][12] h[3][13] h[4][0] h[4][1] h[4][2] h[4][3] h[4][4] h[4][5] h[4][6] h[4][7] h[4][8] h[4][9] h[4][10]
h[4][11] h[4][12] h[4][13] h[5][0] h[5][1] h[5][2] h[5][3] h[5][4] h[5][5] h[5][6] h[5][7] h[5][8] h[5][9] h[5][10] h[5][11] h[5][12]
h[5][13] h[6][0] h[6][1] h[6][2] h[6][3] h[6][4] h[6][5] h[6][6] h[6][7] h[6][8] h[6][9] h[6][10] h[6][11] h[6][12] h[6][13] h[7][0] h[7][1]
h[7][2] h[7][3] h[7][4] h[7][5] h[7][6] h[7][7] h[7][8] h[7][9] h[7][10] h[7][11] h[7][12] h[7][13] a[0][0] a[0][1] a[0][2] a[0][3] a[0][4]
a[0][5] a[0][6] a[0][7] a[0][8] a[0][9] a[0][10] a[0][11] a[0][12] a[0][13] a[1][0] a[1][1] a[1][2] a[1][3] a[1][4] a[1][5] a[1][6] a[1][7]
a[1][8] a[1][9] a[1][10] a[1][11] a[1][12] a[1][13] a[2][0] a[2][1] a[2][2] a[2][3] a[2][4] a[2][5] a[2][6] a[2][7] a[2][8] a[2][9] a[2][10]
a[2][11] a[2][12] a[2][13] a[3][0] a[3][1] a[3][2] a[3][3] a[3][4] a[3][5] a[3][6] a[3][7] a[3][8] a[3][9] a[3][10] a[3][11] a[3][12]
a[3][13] a[4][0] a[4][1] a[4][2] a[4][3] a[4][4] a[4][5] a[4][6] a[4][7] a[4][8] a[4][9] a[4][10] a[4][11] a[4][12] a[4][13] a[5][0] a[5][1]
a[5][2] a[5][3] a[5][4] a[5][5] a[5][6] a[5][7] a[5][8] a[5][9] a[5][10] a[5][11] a[5][12] a[5][13] a[6][0] a[6][1] a[6][2] a[6][3] a[6][4]
a[6][5] a[6][6] a[6][7] a[6][8] a[6][9] a[6][10] a[6][11] a[6][12] a[6][13] a[7][0] a[7][1] a[7][2] a[7][3] a[7][4] a[7][5] a[7][6] a[7][7]
a[7][8] a[7][9] a[7][10] a[7][11] a[7][12] a[7][13] t[0][0] t[0][1] t[0][2] t[0][3] t[0][4] t[0][5] t[0][6] t[0][7] t[0][8] t[0][9] t[0][10]
t[0][11] t[0][12] t[0][13] t[0][14] t[1][0] t[1][1] t[1][2] t[1][3] t[1][4] t[1][5] t[1][6] t[1][7] t[1][8] t[1][9] t[1][10] t[1][11]
t[1][12] t[1][13] t[1][14] t[2][0] t[2][1] t[2][2] t[2][3] t[2][4] t[2][5] t[2][6] t[2][7] t[2][8] t[2][9] t[2][10] t[2][11] t[2][12]
t[2][13] t[2][14] t[3][0] t[3][1] t[3][2] t[3][3] t[3][4] t[3][5] t[3][6] t[3][7] t[3][8] t[3][9] t[3][10] t[3][11] t[3][12] t[3][13]
t[3][14] t[4][0] t[4][1] t[4][2] t[4][3] t[4][4] t[4][5] t[4][6] t[4][7] t[4][8] t[4][9] t[4][10] t[4][11] t[4][12] t[4][13] t[4][14]
t[5][0] t[5][1] t[5][2] t[5][3] t[5][4] t[5][5] t[5][6] t[5][7] t[5][8] t[5][9] t[5][10] t[5][11] t[5][12] t[5][13] t[5][14] t[6][0] t[6][1]
t[6][2] t[6][3] t[6][4] t[6][5] t[6][6] t[6][7] t[6][8] t[6][9] t[6][10] t[6][11] t[6][12] t[6][13] t[6][14] t[7][0] t[7][1] t[7][2] t[7][3]
t[7][4] t[7][5] t[7][6] t[7][7] t[7][8] t[7][9] t[7][10] t[7][11] t[7][12] t[7][13] t[7][14] </list> <values> 1 2 7 4 6 5 6 3 5 7 3 1 4 2 0
7 3 3 7 4 5 4 2 5 6 0 2 6 7 0 5 7 3 6 3 5 1 6 4 4 1 0 6 4 1 1 2 7 2 0 7 4 0 5 6 5 5 3 6 0 5 1 7 1 6 3 2 2 0 7 4 6 2 6 4 0 1 2 0 1 7 3 7 3 3
5 4 5 0 2 0 7 4 2 1 7 3 1 2 1 0 2 1 3 4 6 3 0 5 6 5 4 0 0 1 0 0 0 1 1 1 0 0 1 1 1 1 1 1 0 0 1 0 0 1 1 0 0 0 1 1 1 0 0 0 1 1 1 0 0 0 1 1 0 0
0 0 1 1 1 0 0 0 1 1 0 1 1 0 1 0 1 1 0 1 1 1 0 1 0 0 0 1 1 1 0 0 1 1 0 0 0 1 1 0 0 1 0 1 1 1 0 0 1 0 1 1 0 0 0 0 0 0 1 1 0 0 0 1 1 0 1 1 1 1
1 0 1 1 1 0 0 0 1 1 0 0 0 0 0 0 1 1 0 1 1 0 0 1 1 1 0 0 0 1 1 1 0 0 0 1 1 1 0 0 1 1 1 1 0 0 0 1 1 1 0 0 1 0 0 1 0 1 0 0 1 0 0 0 1 0 1 1 1 0
0 0 1 1 0 0 1 1 1 0 0 1 1 0 1 0 0 0 1 1 0 1 0 0 1 1 1 1 1 1 0 0 1 1 1 0 0 1 0 0 0 10 22 15 36 18 27 39 0 0 44 14 34 0 0 0 0 0 0 32 14 44 40
35 31 0 39 44 15 22 0 0 0 50 48 14 47 0 0 22 39 18 45 0 15 15 47 18 31 32 0 0 47 15 44 14 0 41 41 0 0 35 35 18 18 0 31 31 0 0 51 51 45 15 44
64 0 0 0 27 18 35 0 50 15 10 40 0 48 14 41 0 27 27 0 0 56 15 44 18 18 0 59 14 32 39 56 22 10 44 0 14 51 18 59 0 48 48 0 0 0 </values>
</instantiation>