Name | csp/rlfapGraphs/ normalized-graph10.xml |
MD5SUM | 6343a8d49ea791a447d6fc04b8a967e7 |
Bench Category | 2-ARY-INT (binary constraints in intension) |
Best result obtained on this benchmark | SAT |
Best CPU time to get the best result obtained on this benchmark | 1.01484 |
Satisfiable | |
(Un)Satisfiability was proved | |
Number of variables | 680 |
Number of constraints | 3907 |
Maximum constraint arity | 2 |
Maximum domain size | 44 |
Number of constraints which are defined in extension | 0 |
Number of constraints which are defined in intension | 3907 |
Global constraints used (with number of constraints) |
This section presents information obtained from the best job displayed in the list (i.e. solvers whose names are not hidden).
Solution found:16 254 86 324 86 324 666 428 114 352 30 268 16 254 16 254 100 338 764 526 86 324 680 442 100 338 30 268 708 470 156 394 16 254 128 366 750 512 58 296 764 526 30 268 114 352 128 366 44 282 778 540 100 338 58 296 16 254 16 254 778 540 44 282 44 282 58 296 30 268 44 282 30 268 128 366 44 282 764 526 30 268 128 366 792 554 114 352 128 366 114 352 666 428 100 338 722 484 736 498 156 394 128 366 778 540 114 352 114 352 764 526 30 268 694 456 778 540 16 254 142 380 708 470 652 414 652 414 750 512 44 282 114 352 722 484 72 310 778 540 30 268 128 366 652 414 722 484 750 512 750 512 750 512 764 526 30 268 750 512 114 352 16 254 72 310 156 394 778 540 764 526 86 324 58 296 722 484 16 254 156 394 128 366 156 394 778 540 30 268 750 512 128 366 750 512 16 254 128 366 142 380 142 380 142 380 30 268 764 526 114 352 128 366 750 512 764 526 680 442 156 394 72 310 736 498 680 442 694 456 58 296 142 380 778 540 114 352 16 254 16 254 114 352 156 394 128 366 72 310 778 540 652 414 30 268 86 324 58 296 792 554 156 394 100 338 708 470 736 498 16 254 16 254 72 310 128 366 100 338 694 456 750 512 666 428 736 498 86 324 114 352 750 512 72 310 86 324 72 310 778 540 44 282 722 484 722 484 58 296 72 310 708 470 268 30 722 484 694 456 30 268 708 470 100 338 128 366 16 254 44 282 16 254 30 268 100 338 764 526 708 470 30 268 764 526 764 526 30 268 128 366 680 442 16 254 736 498 708 470 86 324 30 268 128 366 58 296 100 338 100 338 16 254 128 366 156 394 694 456 666 428 156 394 86 324 778 540 30 268 114 352 750 512 750 512 722 484 44 282 156 394 128 366 736 498 44 282 44 282 30 268 750 512 128 366 708 470 30 268 72 310 666 428 694 456 58 296 86 324 666 428 128 366 72 310 142 380 722 484 736 498 142 380 44 282 72 310 72 310 156 394 128 366 58 296 666 428 72 310 750 512 736 498 114 352 680 442 16 254 72 310 666 428 30 268 30 268 764 526 694 456 736 498 680 442 58 296 764 526 44 282 44 282 708 470 100 338 16 254 156 394 156 394 86 324 72 310 750 512 156 394 764 526 750 512 100 338 666 428 722 484 750 512 114 352 156 394 750 512 114 352 156 394 128 366 16 254 142 380 708 470 114 352 778 540 736 498 128 366 58 296 156 394 86 324 764 526 680 442 708 470 156 394 708 470 30 268 764 526 142 380 16 254 16 254 72 310 694 456 16 254 142 380 128 366 778 540 708 470 128 366 736 498 128 366 30 268 680 442 30 268 58 296 708 470 44 282 778 540 652 414 156 394 708 470 16 254 694 456 722 484 114 352 652 414 680 442 72 310 764 526 72 310 44 282 764 526 16 254 750 512 764 526 666 428 58 296 736 498 44 282 16 254 778 540 722 484 30 268 736 498 30 268 30 268 114 352 694 456 750 512 680 442 128 366 778 540 764 526