Name | normalized-PB07/OPT-SMALLINT-NLC/submittedPB07/roussel/factor-mod-B/ factor-mod-size=8-P0=29-P1=61-P2=43-P3=131-P4=2-P5=59-P6=41-B.opb |
MD5SUM | aeb6a0e03ee8f8f2b4b438b8148c9b4c |
Bench Category | OPT-SMALLINT-NLC (optimisation, small integers, non linear constraints) |
Best result obtained on this benchmark | OPT |
Best value of the objective obtained on this benchmark | 2 |
Best CPU time to get the best result obtained on this benchmark | 0.106983 |
Has Objective Function | YES |
Satisfiable | YES |
(Un)Satisfiability was proved | YES |
Best value of the objective function | 2 |
Optimality of the best value was proved | YES |
Number of variables | 144 |
Total number of constraints | 13 |
Number of constraints which are clauses | 0 |
Number of constraints which are cardinality constraints (but not clauses) | 0 |
Number of constraints which are nor clauses,nor cardinality constraints | 13 |
Minimum length of a constraint | 8 |
Maximum length of a constraint | 80 |
Number of terms in the objective function | 8 |
Biggest coefficient in the objective function | 128 |
Number of bits for the biggest coefficient in the objective function | 8 |
Sum of the numbers in the objective function | 255 |
Number of bits of the sum of numbers in the objective function | 8 |
Biggest number in a constraint | 32768 |
Number of bits of the biggest number in a constraint | 16 |
Biggest sum of numbers in a constraint | 130560 |
Number of bits of the biggest sum of numbers | 17 |
Number of products (including duplicates) | 384 |
Sum of products size (including duplicates) | 768 |
Number of different products | 384 |
Sum of products size | 768 |
Solver Name | TraceID | Answer | objective function | CPU time | Wall clock time |
---|---|---|---|---|---|
minisatp 2012-10-02 git-d91742b (complete) | 4114801 | OPT | 2 | 0.106983 | 0.106915 |
Sat4j PB 2.3.6 Resolution PB16 (complete) | 4106441 | OPT | 2 | 0.662899 | 0.396415 |
toysat 2016-05-02 (complete) | 4106439 | OPT | 2 | 6.52501 | 6.52858 |
Sat4j PB 2.3.6 Res+CP PB16 (complete) | 4106440 | OPT | 2 | 11.2253 | 5.76143 |
This section presents information obtained from the best job displayed in the list (i.e. solvers whose names are not hidden).
objective function: 2-x1 x2 -x3 -x4 -x5 -x6 -x7 -x8 x9 x10 x11 x12 x13 -x14 -x15 x16 x17 -x18 x19 x20 x21 x22 x23 -x24 x25 x26 x27 x28 x29 -x30 x31 x32 x33 x34 -x35 x36 -x37 x38 x39 x40 x41 x42 -x43 -x44 x45 -x46 -x47 -x48 x49 x50 x51 -x52 x53 x54 -x55 -x56 -x145 x146 -x147 -x148 -x149 -x150 -x151 -x152 -x153 x154 -x155 -x156 -x157 -x158 -x159 -x160 -x161 x162 -x163 -x164 -x165 -x166 -x167 -x168 -x169 x170 -x171 -x172 -x173 -x174 -x175 -x176 -x177 x178 -x179 -x180 -x181 -x182 -x183 -x184 -x185 -x186 -x187 -x188 -x189 -x190 -x191 -x192 -x193 -x194 -x195 -x196 -x197 -x198 -x199 -x200 -x201 x202 -x203 -x204 -x205 -x206 -x207 -x208 -x57 x58 x59 x60 x61 x62 -x63 -x64 x97 -x98 -x99 -x100 -x101 -x102 -x103 -x104 -x209 x210 x211 x212 x213 x214 -x215 -x216 -x217 -x218 -x219 -x220 -x221 -x222 -x223 -x224 -x225 x226 x227 x228 x229 x230 -x231 -x232 -x233 x234 x235 x236 x237 x238 -x239 -x240 -x241 x242 x243 x244 x245 x246 -x247 -x248 -x249 x250 x251 x252 x253 x254 -x255 -x256 -x257 x258 x259 x260 x261 x262 -x263 -x264 -x265 -x266 -x267 -x268 -x269 -x270 -x271 -x272 -x65 x66 x67 -x68 -x69 -x70 x71 -x72 -x105 x106 x107 x108 x109 -x110 -x111 -x112 -x273 x274 x275 -x276 -x277 -x278 x279 -x280 -x281 x282 x283 -x284 -x285 -x286 x287 -x288 -x289 x290 x291 -x292 -x293 -x294 x295 -x296 -x297 x298 x299 -x300 -x301 -x302 x303 -x304 -x305 x306 x307 -x308 -x309 -x310 x311 -x312 -x313 -x314 -x315 -x316 -x317 -x318 -x319 -x320 -x321 x322 x323 -x324 -x325 -x326 x327 -x328 -x329 x330 x331 -x332 -x333 -x334 x335 -x336 -x73 x74 -x75 x76 x77 x78 x79 x80 -x113 -x114 x115 x116 x117 x118 -x119 -x120 -x337 x338 -x339 x340 x341 x342 x343 x344 -x345 x346 -x347 x348 x349 x350 x351 x352 -x353 -x354 -x355 -x356 -x357 -x358 -x359 -x360 -x361 x362 -x363 x364 x365 x366 x367 x368 -x369 -x370 -x371 -x372 -x373 -x374 -x375 -x376 -x377 x378 -x379 x380 x381 x382 x383 x384 -x385 x386 -x387 x388 x389 x390 x391 x392 -x393 x394 -x395 x396 x397 x398 x399 x400 -x81 x82 x83 x84 x85 x86 x87 -x88 x121 -x122 x123 -x124 -x125 x126 x127 x128 -x401 x402 x403 x404 x405 x406 x407 -x408 -x409 x410 x411 x412 x413 x414 x415 -x416 -x417 -x418 -x419 -x420 -x421 -x422 -x423 -x424 -x425 -x426 -x427 -x428 -x429 -x430 -x431 -x432 -x433 x434 x435 x436 x437 x438 x439 -x440 -x441 -x442 -x443 -x444 -x445 -x446 -x447 -x448 -x449 -x450 -x451 -x452 -x453 -x454 -x455 -x456 -x457 -x458 -x459 -x460 -x461 -x462 -x463 -x464 -x89 x90 -x91 x92 x93 -x94 x95 -x96 x129 -x130 -x131 x132 -x133 -x134 -x135 -x136 -x465 x466 -x467 x468 x469 -x470 x471 -x472 -x473 x474 -x475 x476 x477 -x478 x479 -x480 -x481 x482 -x483 x484 x485 -x486 x487 -x488 -x489 -x490 -x491 -x492 -x493 -x494 -x495 -x496 -x497 x498 -x499 x500 x501 -x502 x503 -x504 -x505 x506 -x507 x508 x509 -x510 x511 -x512 -x513 -x514 -x515 -x516 -x517 -x518 -x519 -x520 -x521 -x522 -x523 -x524 -x525 -x526 -x527 -x528 x137 x138 -x139 -x140 x141 -x142 -x143 -x144