| Name | /SOFT-BIGINT-LIN/PB06/web/ uclid_pb_benchmarks/normalized-cache.inv14.ucl--soft-0-100-0.wbo |
| MD5SUM | 3a86913522c106cb1fc25a782e5ea662 |
| Bench Category | SOFT-BIGINT-LIN (only soft constraints, big integers, linear constraints) |
| Best result obtained on this benchmark | MSAT |
| Best cost obtained on this benchmark | 1 |
| Best CPU time to get the best result obtained on this benchmark | 1800.06 |
| Max-Satisfiable | |
| Max-(Un)Satisfiability was proved | |
| Best value of the cost | |
| Optimality of the best cost was proved | |
| Number of variables | 62704 |
| Total number of constraints | 187107 |
| Number of soft constraints | 187107 |
| Number of constraints which are clauses | 186603 |
| Number of constraints which are cardinality constraints (but not clauses) | 0 |
| Number of constraints which are nor clauses,nor cardinality constraints | 504 |
| Minimum length of a constraint | 1 |
| Maximum length of a constraint | 11 |
| Top cost | 9452684 |
| Min constraint cost | 1 |
| Max constraint cost | 100 |
| Sum of constraints costs | 9452683 |
| Biggest number in a constraint | 33 |
| Number of bits of the biggest number in a constraint | 6 |
| Biggest sum of numbers in a constraint | 126 |
| Number of bits of the biggest sum of numbers | 7 |
| Number of products (including duplicates) | 0 |
| Sum of products size (including duplicates) | 0 |
| Number of different products | 0 |
| Sum of products size | 0 |
| Solver Name | TraceID | Answer | CPU time | Wall clock time |
|---|---|---|---|---|
| NaPS 1.02 (complete) | 4094969 | MSAT | 131.627 | 131.684 |
| Sat4j PB 2.3.6 Resolution PB16 (complete) | 4090811 | MSAT (TO) | 1800.06 | 1790.99 |
| Sat4j PB 2.3.6 Res+CP PB16 (complete) | 4092197 | MSAT (TO) | 1800.79 | 1619.87 |
| toysat 2016-05-02 (complete) | 4093583 | ? (TO) | 1800.05 | 1800.41 |
This section presents information obtained from the best job displayed in the list (i.e. solvers whose names are not hidden).
cost of falsified constraints: 17977-x62314 -x62315 -x62316 -x62317 -x62318 -x62319 -x62320 -x62321 -x62322 -x62323 -x62324 -x62325 -x62326 -x62327 -x62328 -x62329 -x62330 -x62331 -x62332 -x62333 -x62334 -x62335 -x62336 -x62337 -x62338 -x62339 -x62340 -x62341 -x62342 -x62343 -x62344 -x62345 -x62346 -x62347 -x62348 -x62349 -x62350 -x62351 -x62352 -x62353 -x62354 -x62355 -x62356 -x62357 -x62358 -x62359 -x62360 -x62361 -x62362 -x62363 -x62364 -x62365 -x62366 -x62367 -x62368 -x62369 -x62370 -x62371 -x62372 -x62373 -x62374 -x62375 -x62376 -x62377 -x62378 -x62379 -x62380 -x62381 -x62382 -x62383 -x62384 -x62385 -x62386 -x62387 -x62388 -x62389 -x62390 -x62391 -x62392 -x62393 -x62394 -x62395 -x62396 -x62397 -x62398 -x62399 -x62400 -x62401 -x62402 -x62403 -x62404 -x62405 -x62406 -x62407 -x62408 -x62409 -x62410 -x62411 -x62412 -x62413 -x62414 -x62415 -x62416 -x62417 -x62418 -x62419 -x62420 -x62421 -x62422 -x62423 -x62424 -x62425 -x62426 -x62427 -x62428 -x62429 -x62430 -x62431 -x62432 -x62433 -x62434 -x62435 -x62436 -x62437 -x62438 -x62439 -x62440 -x62441 -x62442 -x62443 -x62444 -x62445 -x62446 -x62447 -x62448 -x62449 -x62450 -x62451 -x62452 -x62453 -x62454 -x62455 -x62456 -x62457 -x62458 -x62459 -x62460 -x62461 -x62462 -x62463 -x62464 -x62465 -x62466 -x62467 -x62468 -x62469 -x62470 -x62471 -x62472 -x62473 -x62474 -x62475 -x62476 -x62477 -x62478 -x62479 -x62480 -x62481 -x62482 -x62483 -x62484 -x62485 -x62486 -x62487 -x62488 -x62489 -x62490 -x62491 -x62492 -x62493 -x62494 -x62495 -x62496 -x62497 -x62498 -x62499 -x62500 -x62501 -x62502 -x62503 -x62504 -x62505 -x62506 -x62507 -x62508 -x62509 -x62510 -x62511 -x62512 -x62513 -x62514 -x62515 -x62516 -x62517 -x62518 -x62519 -x62520 -x62521 -x62522 -x62523 -x62524 -x62525 -x62526 -x62527 -x62528 -x62529 -x62530 -x62531 -x62532 -x62533 -x62534 -x62535 -x62536 -x62537 -x62538 -x62539 -x62540 -x62541 -x62542 -x62543 -x62544 -x62545 -x62546 -x62547 -x62548 -x62549 -x62550 -x62551 -x62552 -x62553 -x62554 -x62555 -x62556 -x62557 -x62558 -x62559 -x62560 -x62561 -x62562 -x62563 -x62564 -x62565 -x62566 -x62567 -x62568 -x62569 -x62570 -x62571 -x62572 -x62573 -x62574 -x62575 -x62576 -x62577 -x62578 -x62579 -x62580 -x62581 -x62582 -x62583 -x62584 -x62585 -x62586 -x62587 -x62588 -x62589 -x62590 -x62591 -x62592 -x62593 -x62594 -x62595 -x62596 -x62597 -x62598 -x62599 -x62600 -x62601 -x62602 -x62603 -x62604 -x62605 -x62606 -x62607 -x62608 -x62609 -x62610 -x62611 -x62612 -x62613 -x62614 -x62615 -x62616 -x62617 -x62618 x62619 -x62620 -x62621 x62622 -x62623 -x62624 x62625 -x62626 -x62627 -x62628 -x62629 -x62630 -x62631 -x62632 x62633 -x62634 x62635 x62636 x62637 x62638 -x62639 x62640 x62641 x62642 x62643 -x62644 x62645 x62646 x62647 x62648 -x62649 x62650 x62651 x62652 x62653 -x62654 x62655 x62656 x62657 x62658 -x62659 x62660 x62661 x62662 x62663 -x62664 x62665 x62666 x62667 x62668 -x62669 x62670 x62671 x62672 x62673 -x62674 x62675 x62676 x62677 x62678 -x62679 x62680 x62681 x62682 x62683 -x62684 -x62685 -x62686 -x62687 -x62688 -x62689 x62690 x62691 x62692 x62693 -x62694 x62695 x62696 x62697 x62698 -x62699 x62700 x62701 -x62702 x62703 x62704