2018 XCSP3 competition: mini-solvers track: solvers results per benchmarks

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

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

<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>

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

2018 XCSP3 competition: mini-solvers track: solvers results per benchmarks

Result page for benchmark
CrosswordDesign/
CrosswordDesign-11-4-rom_c18.xml

General information on the benchmark

Results of the different solvers on this benchmark

Additionnal information

2018 XCSP3 competition: mini-solvers track: solvers results per benchmarks

Result page for benchmarkCrosswordDesign/CrosswordDesign-11-4-rom_c18.xml

General information on the benchmark

Results of the different solvers on this benchmark

Additionnal information

Result page for benchmark
CrosswordDesign/
CrosswordDesign-11-4-rom_c18.xml