Gurobi 5.0.1 (linux64) logging started Tue Dec 25 01:21:51 2012 Optimize a model with 40802 rows, 40401 columns and 245207 nonzeros Presolve removed 19312 rows and 20505 columns Presolve time: 0.62s Presolved: 21490 rows, 19896 columns, 107606 nonzeros Variable types: 193 continuous, 19703 integer (19703 binary) Root relaxation: objective 9.168296e+02, 1860 iterations, 0.24 seconds Nodes | Current Node | Objective Bounds | Work Expl Unexpl | Obj Depth IntInf | Incumbent BestBd Gap | It/Node Time 0 0 916.82959 0 399 - 916.82959 - - 1s 0 0 942.68846 0 396 - 942.68846 - - 2s 0 0 947.94374 0 415 - 947.94374 - - 2s 0 0 948.97450 0 416 - 948.97450 - - 3s 0 0 949.43267 0 446 - 949.43267 - - 3s 0 0 949.53633 0 446 - 949.53633 - - 3s 0 0 949.63984 0 404 - 949.63984 - - 4s 0 0 949.82837 0 397 - 949.82837 - - 5s 0 0 949.85693 0 422 - 949.85693 - - 5s 0 0 949.85693 0 422 - 949.85693 - - 8s 0 2 950.09354 0 406 - 950.09354 - - 11s 173 163 985.64857 48 355 - 953.73905 - 14.9 15s 494 382 1004.34375 47 396 - 954.32687 - 18.7 20s 603 471 985.09115 53 413 - 954.36349 - 18.8 49s 604 472 989.71791 57 397 - 954.36349 - 18.8 73s 605 473 990.05125 40 398 - 959.19572 - 18.7 102s 606 473 972.83568 19 393 - 964.54561 - 18.7 147s 607 474 988.95138 54 363 - 967.30225 - 18.7 174s 608 475 998.48249 61 405 - 968.63621 - 18.7 204s 609 475 992.08655 39 427 - 969.73419 - 18.6 243s 610 476 990.05125 40 409 - 971.56502 - 18.6 278s 611 477 972.83568 19 435 - 972.54259 - 18.6 342s 612 477 990.05125 40 390 - 973.80991 - 18.5 369s 613 478 974.49223 19 365 - 974.49223 - 18.5 407s 614 479 974.58201 13 423 - 974.58201 - 18.5 436s 615 479 998.48249 61 449 - 974.94879 - 18.4 470s 616 480 1004.32802 69 436 - 975.69769 - 18.4 510s 617 481 990.05125 40 452 - 976.32207 - 18.4 546s 618 481 1032.38036 105 372 - 977.05433 - 18.3 581s 619 482 977.93853 13 430 - 977.93853 - 18.3 617s 620 483 978.40092 13 453 - 978.40092 - 18.3 646s 621 483 1004.32802 69 435 - 978.94472 - 18.3 677s 622 484 985.09115 53 485 - 979.12644 - 18.2 705s 623 485 1032.38036 105 443 - 979.66910 - 18.2 737s 624 485 1037.84637 112 396 - 979.71168 - 18.2 766s 625 486 1032.38036 105 449 - 979.73517 - 18.1 795s 626 487 1004.32802 69 449 - 979.96562 - 18.1 825s 627 487 980.30313 13 459 - 980.30313 - 18.1 855s 628 488 980.30561 30 428 - 980.30561 - 18.1 884s 629 489 988.95138 54 463 - 980.31948 - 18.0 902s 630 489 980.31948 17 424 - 980.31948 - 18.0 921s 633 493 992.72849 67 422 - 980.40698 - 66.5 941s 635 494 980.40698 11 412 - 980.40698 - 66.3 983s 636 495 980.40698 25 421 - 980.40698 - 66.2 1025s 637 496 992.72849 67 396 - 980.45087 - 66.1 1065s 638 496 985.09115 53 433 - 980.56025 - 66.0 1106s 639 497 989.71791 57 441 - 980.81200 - 65.8 1150s 640 498 988.95138 54 466 - 980.85164 - 65.7 1203s 641 498 980.94202 25 465 - 980.94202 - 65.6 1239s 642 499 989.71791 57 436 - 981.00579 - 65.5 1289s 643 500 981.08770 21 438 - 981.08770 - 65.4 1325s 644 500 981.23215 13 432 - 981.23215 - 65.3 1376s 645 501 1032.38036 105 457 - 981.25051 - 65.2 1395s 646 502 988.95138 54 425 - 981.26976 - 65.1 1446s 647 502 985.09115 53 457 - 981.31427 - 65.0 1474s 648 503 981.31514 13 445 - 981.31514 - 64.9 1500s 649 504 998.48249 61 414 - 981.31519 - 64.8 1530s 650 504 992.08655 39 444 - 981.33030 - 64.7 1570s 651 505 981.33090 17 444 - 981.33090 - 64.6 1593s 652 506 981.33090 19 444 - 981.33090 - 64.5 1613s 653 506 981.33090 11 444 - 981.33090 - 64.4 1626s 654 509 981.33093 22 461 - 981.33090 - 93.5 1630s 663 515 982.20125 26 361 - 981.33118 - 93.1 1635s 760 579 994.00599 75 311 - 981.33118 - 86.2 1640s 892 638 994.79035 50 350 - 982.20285 - 77.7 1645s 1082 751 989.67265 49 308 - 982.23423 - 68.4 1650s 1341 879 986.27599 38 372 - 982.40401 - 59.0 1655s 1460 958 999.26153 89 308 - 982.40401 - 59.1 1660s 1588 1040 1033.75061 130 255 - 982.40401 - 58.0 1665s 1770 1138 993.83743 48 344 - 982.41951 - 54.3 1670s 1981 1266 985.68999 45 389 - 982.41951 - 51.3 1675s 2206 1427 1008.80772 92 170 - 982.41951 - 49.3 1680s 2370 1579 infeasible 117 - 982.41951 - 48.8 1685s 2578 1749 1047.93007 121 327 - 982.41983 - 46.9 1690s 2837 1963 990.41365 65 338 - 982.46705 - 44.5 1695s 3031 2097 996.76893 59 347 - 982.50215 - 43.8 1700s 3188 2212 1003.57943 65 342 - 982.50215 - 44.2 1705s 3388 2338 1009.33204 69 351 - 982.50215 - 43.3 1710s 3515 2443 1060.04579 120 288 - 982.50215 - 43.7 1715s 3721 2584 985.01582 46 353 - 982.51100 - 43.2 1720s 3930 2775 1002.61857 79 211 - 982.51100 - 42.7 1725s 4131 2943 1004.94318 82 162 - 982.52752 - 42.4 1730s 4320 3099 1022.10937 83 311 - 982.53886 - 41.8 1735s 4574 3290 1048.88730 96 334 - 982.54176 - 40.8 1740s 4821 3494 1024.84863 92 342 - 982.58515 - 40.1 1745s 4965 3618 infeasible 83 - 982.58850 - 40.3 1750s 5082 3717 1018.86258 45 400 - 982.58850 - 40.6 1756s 5242 3847 infeasible 119 - 982.58850 - 40.5 1760s 5405 3981 infeasible 110 - 982.59467 - 40.7 1765s 5687 4201 994.62158 46 342 - 982.60247 - 39.7 1770s 5902 4373 1012.98165 89 348 - 982.60249 - 39.4 1775s 6142 4539 1030.33924 91 375 - 982.61672 - 38.9 1780s 6342 4672 infeasible 112 - 982.62806 - 38.6 1785s 6614 4869 998.98508 70 360 - 982.64634 - 37.9 1790s 6786 5010 1000.80012 78 307 - 982.64634 - 38.1 1795s 7162 5312 1017.86493 75 359 - 982.69803 - 37.0 1800s 7353 5483 992.93055 66 349 - 982.70647 - 36.9 1805s 7699 5782 1031.23232 98 213 - 982.70647 - 36.2 1810s 7937 5951 988.81097 42 264 - 982.70647 - 36.0 1815s 8275 6254 1045.26316 108 221 - 982.70647 - 35.3 1820s 8564 6472 infeasible 74 - 982.70976 - 34.9 1825s 8814 6658 982.99197 32 388 - 982.71997 - 34.7 1830s 9103 6886 983.62366 40 386 - 982.75156 - 34.3 1835s 9425 7128 1046.56557 109 330 - 982.77139 - 33.8 1840s 9752 7357 982.94792 35 389 - 982.78771 - 33.4 1845s 10030 7583 995.63941 54 366 - 982.79041 - 33.1 1851s 10201 7723 1033.96545 104 224 - 982.79711 - 32.7 1856s 10346 7836 987.34408 38 392 - 982.81134 - 32.9 1860s 10602 8044 1027.85966 101 340 - 982.81315 - 32.8 1865s 10848 8234 990.25785 39 410 - 982.81594 - 32.8 1870s 11098 8435 1001.60177 40 393 - 982.81732 - 32.7 1875s 11270 8580 993.69544 59 331 - 982.83023 - 32.8 1880s 11499 8747 982.99197 31 389 - 982.83783 - 32.7 1885s 11707 8910 989.52125 44 364 - 982.84472 - 32.8 1890s 11905 9062 1027.31399 78 363 - 982.84966 - 32.9 1895s 12117 9234 1021.29375 87 322 - 982.85873 - 33.0 1900s 12325 9420 1010.88061 68 250 - 982.86362 - 33.0 1905s 12602 9633 1009.72167 82 206 - 982.86496 - 32.9 1910s 12962 9926 infeasible 66 - 982.86697 - 32.5 1915s 13255 10144 994.90026 55 340 - 982.86935 - 32.3 1920s 13400 10264 1004.79161 72 346 - 982.86935 - 32.5 1925s 13720 10521 infeasible 102 - 982.87518 - 32.4 1930s 13917 10675 1018.32862 86 334 - 982.87791 - 32.4 1935s 14176 10868 1022.03598 82 334 - 982.88597 - 32.3 1940s 14587 11194 infeasible 94 - 982.89059 - 31.9 1945s 14858 11400 1024.56251 97 350 - 982.90031 - 31.8 1950s 15097 11551 992.61151 46 250 - 982.90031 - 31.8 1955s 15345 11736 1005.70230 65 215 - 982.90063 - 31.6 1960s 15539 11892 1090.53453 120 294 - 982.92359 - 31.8 1965s 15629 11959 infeasible 78 - 982.93086 - 32.3 1972s 15685 11990 985.25717 45 390 - 982.93086 - 32.3 1975s 15878 12153 1005.54761 73 334 - 982.93245 - 32.3 1980s 16138 12329 993.65081 59 335 - 982.93306 - 32.2 1985s 16263 12432 1007.80357 68 323 - 982.93381 - 32.3 1990s 16435 12573 995.82360 63 231 - 982.93729 - 32.4 1995s 16663 12747 993.09741 46 344 - 982.94641 - 32.4 2000s 16786 12843 1010.57363 70 358 - 982.94792 - 32.6 2005s 16972 12974 1011.81155 58 344 - 982.94792 - 32.6 2010s 17171 13140 1032.15311 103 314 - 982.94792 - 32.6 2015s 17363 13294 998.41343 70 344 - 982.94852 - 32.7 2020s 17557 13456 1008.14928 65 226 - 982.95313 - 32.6 2025s 17732 13589 1041.77922 107 340 - 982.95313 - 32.7 2030s 17899 13712 990.53831 47 353 - 982.95932 - 32.8 2035s 18156 13898 1045.25607 119 359 - 982.96584 - 32.7 2040s 18346 14044 1005.32869 60 324 - 982.97263 - 32.8 2045s 18537 14187 1017.08189 70 350 - 982.97446 - 32.8 2050s 18726 14342 infeasible 123 - 982.97537 - 33.0 2055s 18943 14501 983.11388 36 389 - 982.97685 - 32.9 2060s 19127 14645 991.50946 45 355 - 982.97831 - 32.9 2065s 19414 14864 1052.22128 121 329 - 982.98131 - 32.8 2070s 19682 15066 1029.24259 100 329 - 982.99006 - 32.7 2075s 19795 15152 infeasible 72 - 982.99166 - 33.2 2082s 19876 15197 990.63450 45 344 - 982.99330 - 33.1 2085s 19951 15264 infeasible 89 - 982.99330 - 33.3 2090s 20139 15410 991.36395 38 385 - 982.99800 - 33.3 2095s 20313 15544 988.72952 45 345 - 982.99854 - 33.4 2100s 20402 15629 1022.44343 72 338 - 982.99854 - 33.6 2106s 20517 15711 994.25008 65 368 - 983.00145 - 33.7 2110s 20718 15874 994.78904 57 360 - 983.00383 - 33.7 2115s 20862 15987 994.46420 51 332 - 983.00383 - 33.8 2120s 20988 16098 infeasible 79 - 983.00383 - 33.9 2125s 21131 16231 1048.15818 159 111 - 983.00383 - 33.9 2130s 21379 16439 1022.26762 96 206 - 983.00383 - 33.8 2135s 21585 16601 998.05308 54 336 - 983.00383 - 33.8 2140s 21768 16740 infeasible 97 - 983.00568 - 33.9 2145s 21993 16930 1003.60643 55 344 - 983.00568 - 33.8 2150s 22235 17121 1020.33662 96 201 - 983.00568 - 33.7 2155s 22542 17370 992.83459 56 247 - 983.01435 - 33.5 2160s 22746 17528 985.45482 40 388 - 983.01627 - 33.5 2165s 22988 17746 1030.41738 76 346 - 983.02178 - 33.4 2170s 23187 17893 989.18182 50 345 - 983.02600 - 33.4 2175s 23357 18052 996.38695 78 355 - 983.02737 - 33.5 2180s 23475 18121 983.57212 35 414 - 983.02936 - 33.6 2185s 23685 18290 988.33895 36 374 - 983.03254 - 33.6 2190s 23866 18436 988.34823 34 390 - 983.03517 - 33.7 2195s 24032 18563 996.26807 54 363 - 983.03700 - 33.8 2200s 24144 18665 1004.19836 56 354 - 983.03764 - 34.0 2205s 24344 18829 1006.21563 61 367 - 983.04505 - 34.0 2210s 24517 18976 1018.90572 77 320 - 983.04505 - 34.1 2215s 24644 19071 1022.25868 70 338 - 983.04505 - 34.2 2220s 24659 19081 infeasible 81 - 983.04505 - 35.2 2240s 24723 19129 1008.40764 66 369 - 983.04505 - 35.3 2245s 24943 19279 986.73557 36 404 - 983.04505 - 35.2 2250s 25118 19408 993.16888 44 356 - 983.05736 - 35.3 2255s 25336 19596 1042.76325 105 347 - 983.05886 - 35.3 2260s 25377 19619 994.58962 48 383 - 983.05886 - 35.4 2265s 25544 19742 990.37285 41 368 - 983.05939 - 35.4 2270s 25703 19869 infeasible 78 - 983.06046 - 35.5 2275s 25870 19994 998.74130 56 334 - 983.06663 - 35.6 2280s 26027 20114 1007.83595 70 335 - 983.07491 - 35.7 2285s 26234 20267 995.95941 50 312 - 983.08443 - 35.6 2290s 26336 20353 992.39449 57 329 - 983.08591 - 35.8 2295s 26578 20536 1040.67823 114 351 - 983.08841 - 35.7 2300s 26685 20612 1046.60370 89 199 - 983.09060 - 35.9 2305s 26841 20733 997.41103 51 344 - 983.09449 - 35.9 2310s 26988 20846 988.33025 35 378 - 983.10141 - 35.9 2315s 27138 20979 1013.10120 62 340 - 983.10853 - 36.0 2320s 27354 21147 1023.01606 99 333 - 983.10859 - 36.0 2325s 27555 21270 infeasible 59 - 983.10910 - 36.1 2330s 27728 21403 984.98838 32 383 - 983.11879 - 36.1 2335s 27852 21497 1044.11620 101 345 - 983.11879 - 36.2 2340s 27916 21528 993.09557 53 346 - 983.11996 - 36.3 2345s 28053 21643 1047.15813 146 344 - 983.11996 - 36.4 2350s 28219 21765 988.43968 41 372 - 983.12582 - 36.4 2355s 28397 21917 1011.93821 69 341 - 983.12684 - 36.5 2360s 28531 22020 1008.59374 60 382 - 983.12853 - 36.6 2365s 28712 22180 1010.56887 69 387 - 983.12853 - 36.6 2370s 28905 22341 1007.04115 62 359 - 983.12878 - 36.7 2375s 29009 22443 1033.11168 84 359 - 983.12878 - 36.8 2380s 29133 22523 983.83227 39 392 - 983.12904 - 36.9 2385s 29319 22681 1014.25461 64 356 - 983.13062 - 37.0 2390s 29443 22783 1028.70106 98 197 - 983.13228 - 37.1 2395s 29705 22986 1012.19541 60 295 - 983.13713 - 37.0 2400s 29908 23129 991.55517 35 410 - 983.13997 - 37.0 2405s 30035 23230 1062.33839 59 322 - 983.13997 - 37.1 2410s 30234 23381 984.81911 30 378 - 983.14110 - 37.1 2415s 30421 23505 992.69603 50 337 - 983.15397 - 37.1 2420s 30581 23643 infeasible 82 - 983.15508 - 37.2 2425s 30620 23670 1006.07646 57 337 - 983.15662 - 37.2 2431s 30746 23782 996.49972 62 337 - 983.15810 - 37.2 2435s 30997 23964 992.94817 52 341 - 983.15846 - 37.1 2440s 31182 24110 988.99946 42 355 - 983.16717 - 37.1 2445s 31403 24284 1030.23349 89 339 - 983.16744 - 37.1 2450s 31524 24382 1036.18203 98 329 - 983.16950 - 37.3 2455s 31613 24447 1001.14396 71 345 - 983.16957 - 37.5 2460s 31800 24578 990.59335 41 375 - 983.17079 - 37.4 2465s 31984 24711 991.24679 48 368 - 983.17360 - 37.4 2470s 32150 24846 1042.47406 86 201 - 983.17367 - 37.5 2475s 32349 24986 1008.61172 49 228 - 983.17896 - 37.5 2480s 32525 25123 997.50292 54 351 - 983.18158 - 37.5 2485s 32725 25283 1000.31482 68 353 - 983.18253 - 37.5 2490s 32920 25415 1018.50141 86 338 - 983.18272 - 37.4 2495s 33109 25561 1025.18214 62 331 - 983.19075 - 37.4 2500s 33328 25711 1001.57766 57 348 - 983.19796 - 37.4 2505s 33484 25839 1034.25187 90 355 - 983.19972 - 37.5 2510s 33622 25957 1019.60324 46 382 - 983.19985 - 37.6 2515s 33757 26064 1091.49097 121 363 - 983.19985 - 37.7 2520s 33923 26196 1018.22089 77 329 - 983.20657 - 37.7 2525s 34187 26386 1031.82024 94 323 - 983.20703 - 37.6 2530s 34398 26540 1005.04835 73 358 - 983.21011 - 37.6 2535s 34475 26605 infeasible 113 - 983.21011 - 37.8 2541s 34571 26678 1004.35989 55 369 - 983.21011 - 37.9 2545s 34839 26864 infeasible 133 - 983.21233 - 37.8 2550s 35031 27016 1086.41916 152 335 - 983.21782 - 37.8 2555s 35200 27141 997.79233 50 351 - 983.22354 - 37.8 2560s 35394 27292 994.01615 57 339 - 983.22462 - 37.8 2565s 35614 27457 997.61163 51 369 - 983.22943 - 37.8 2570s 35817 27619 1010.35483 65 366 - 983.24049 - 37.8 2575s 36051 27802 1053.07206 132 344 - 983.24551 - 37.8 2580s 36204 27924 1001.21442 54 366 - 983.24577 - 37.9 2585s 36372 28069 1008.20391 59 339 - 983.24577 - 37.9 2590s 36496 28169 infeasible 56 - 983.24577 - 38.1 2596s 36563 28226 infeasible 94 - 983.24577 - 38.2 2600s 36715 28339 1072.59794 104 333 - 983.24873 - 38.2 2605s 36843 28436 1005.92960 54 353 - 983.25137 - 38.3 2610s 36910 28490 986.02324 39 394 - 983.25325 - 38.3 2615s 37074 28638 1022.26910 72 317 - 983.25325 - 38.4 2620s 37266 28793 1012.39040 79 327 - 983.25993 - 38.4 2625s 37496 28987 1002.62130 73 356 - 983.26729 - 38.4 2630s 37620 29092 infeasible 121 - 983.26729 - 38.5 2635s 37744 29150 infeasible 31 - 983.26778 - 38.6 2641s 37846 29250 1020.66169 89 309 - 983.26778 - 38.6 2645s 38062 29414 995.50263 52 219 - 983.26778 - 38.6 2650s 38183 29515 1008.07068 57 254 - 983.27165 - 38.7 2655s 38374 29685 1005.43706 82 343 - 983.27196 - 38.7 2660s 38502 29775 993.87884 54 365 - 983.27707 - 38.7 2665s 38710 29932 983.63256 37 380 - 983.28060 - 38.7 2670s 38899 30086 989.47647 48 365 - 983.28087 - 38.7 2675s 39092 30260 1031.53960 103 318 - 983.28494 - 38.6 2680s 39366 30460 987.23018 48 355 - 983.28700 - 38.5 2685s 39533 30589 1040.56451 121 279 - 983.28700 - 38.6 2690s 39688 30723 1008.64549 57 197 - 983.28700 - 38.6 2695s 39888 30876 1010.29295 66 213 - 983.28700 - 38.5 2700s 40065 31017 1002.64846 54 352 - 983.28998 - 38.5 2705s 40255 31180 1006.21659 73 332 - 983.29043 - 38.5 2710s 40442 31329 infeasible 87 - 983.29282 - 38.5 2715s 40676 31518 985.28407 37 363 - 983.29727 - 38.5 2720s 40772 31596 1006.04770 56 344 - 983.29727 - 38.6 2725s 40804 31617 1015.29470 63 347 - 983.29727 - 38.6 3070s 41025 31778 1011.34919 93 319 - 983.29896 - 38.6 3075s 41322 32016 1011.29461 71 200 - 983.29896 - 38.5 3080s 41486 32142 infeasible 52 - 983.30019 - 38.5 3085s 41669 32289 990.57151 46 360 - 983.30407 - 38.5 3090s 41815 32405 993.45145 46 367 - 983.30505 - 38.6 3095s 41937 32495 1008.15556 49 362 - 983.30517 - 38.6 3100s 42145 32652 993.02538 54 353 - 983.30533 - 38.7 3105s 42364 32827 987.39731 42 368 - 983.30540 - 38.6 3110s 42583 33008 984.26916 34 392 - 983.30626 - 38.6 3115s 42777 33158 1011.51203 58 340 - 983.30672 - 38.6 3120s 43058 33385 989.93818 41 376 - 983.31413 - 38.5 3125s 43244 33537 1006.20117 56 357 - 983.32359 - 38.6 3130s 43385 33650 1006.80057 58 379 - 983.32838 - 38.6 3135s 43539 33783 1053.12429 84 390 - 983.33415 - 38.7 3140s 43811 33988 991.86278 46 355 - 983.34235 - 38.6 3145s 44010 34153 1040.91947 101 269 - 983.34253 - 38.5 3150s 44206 34307 1007.58837 82 326 - 983.34960 - 38.5 3155s 44482 34508 985.68937 40 370 - 983.35021 - 38.5 3160s 44764 34743 1046.20789 97 353 - 983.35287 - 38.4 3165s 45003 34925 990.20584 40 342 - 983.35494 - 38.4 3170s 45140 35041 999.56956 49 336 - 983.35494 - 38.5 3175s 45354 35203 995.02297 45 340 - 983.35725 - 38.5 3180s 45498 35312 1004.12839 41 336 - 983.35782 - 38.5 3185s 45651 35443 1025.26962 67 315 - 983.35931 - 38.6 3190s 45873 35627 infeasible 109 - 983.36398 - 38.5 3195s 46162 35840 infeasible 137 - 983.36879 - 38.5 3202s 46267 35901 985.30591 38 336 - 983.36944 - 38.5 3205s 46486 36067 993.03748 48 359 - 983.37443 - 38.5 3210s 46543 36124 1014.96755 55 376 - 983.37443 - 38.7 3215s 46745 36250 999.03981 51 358 - 983.37471 - 38.7 3220s 46867 36340 infeasible 120 - 983.37471 - 38.9 3228s 46919 36375 991.15660 47 352 - 983.37471 - 38.9 3230s 47091 36503 996.64707 54 365 - 983.37653 - 38.9 3235s 47301 36672 983.38779 36 389 - 983.38078 - 38.9 3240s 47433 36778 1003.16606 55 289 - 983.38199 - 39.0 3245s 47665 36963 994.42456 49 365 - 983.38521 - 39.0 3250s 47856 37120 1006.66333 56 348 - 983.38569 - 39.0 3255s 48005 37243 1024.51701 74 353 - 983.38604 - 39.0 3260s 48205 37400 988.15447 41 376 - 983.39314 - 39.0 3265s 48424 37573 983.72869 37 376 - 983.39406 - 39.0 3270s 48590 37716 1003.61887 55 219 - 983.39537 - 39.0 3275s 48721 37824 1022.51615 79 330 - 983.39888 - 39.1 3280s 48938 37984 1010.98839 56 371 - 983.39888 - 39.1 3285s 49155 38178 994.82532 47 328 - 983.39960 - 39.1 3290s 49369 38340 1030.16086 84 348 - 983.40023 - 39.1 3295s 49470 38405 1015.19447 55 387 - 983.40093 - 39.2 3300s 49626 38541 1010.47320 68 352 - 983.41123 - 39.2 3305s 49828 38729 1090.05685 126 325 - 983.41123 - 39.2 3310s 49971 38824 1002.49991 53 348 - 983.41404 - 39.3 3315s 50100 38940 1021.39877 74 363 - 983.41408 - 39.4 3320s 50270 39084 infeasible 116 - 983.41489 - 39.4 3325s 50403 39191 1008.82559 53 332 - 983.41491 - 39.5 3330s 50597 39342 1011.82292 51 373 - 983.41552 - 39.5 3335s 50741 39459 1007.15489 59 354 - 983.41702 - 39.5 3340s 50924 39605 1013.35526 74 359 - 983.41755 - 39.5 3345s 51040 39710 1006.58036 100 332 - 983.41860 - 39.5 3350s 51210 39849 985.61738 36 379 - 983.42010 - 39.6 3355s 51409 40026 1041.58299 96 340 - 983.42010 - 39.6 3360s 51596 40171 996.94055 46 380 - 983.42028 - 39.6 3365s 51811 40333 987.63899 49 374 - 983.42396 - 39.5 3370s 52019 40508 1056.06334 95 263 - 983.42547 - 39.5 3375s 52229 40666 991.36181 51 346 - 983.42586 - 39.5 3380s 52489 40848 995.38691 49 366 - 983.42779 - 39.5 3385s 52678 40995 1033.15494 75 339 - 983.43262 - 39.4 3390s 52823 41102 infeasible 91 - 983.43385 - 39.5 3395s 52981 41225 1013.18846 47 394 - 983.43682 - 39.5 3400s 53106 41336 1002.78672 66 370 - 983.43917 - 39.6 3405s 53385 41543 infeasible 138 - 983.44078 - 39.5 3410s 53558 41661 1000.32702 53 344 - 983.44222 - 39.5 3415s 53715 41772 1011.13444 44 373 - 983.44222 - 39.5 3420s 53851 41882 995.73733 49 398 - 983.44305 - 39.6 3425s 53971 41944 infeasible 107 - 983.44305 - 39.7 3432s 54029 41982 1008.81737 51 347 - 983.44406 - 39.7 3435s 54170 42095 infeasible 58 - 983.44523 - 39.8 3440s 54356 42244 1035.45243 89 333 - 983.44624 - 39.8 3445s 54594 42426 997.93857 54 333 - 983.45356 - 39.8 3450s 54737 42547 991.23718 42 351 - 983.45471 - 39.8 3455s 54870 42661 infeasible 73 - 983.45511 - 39.9 3460s 55048 42804 991.90757 38 390 - 983.45889 - 39.9 3465s 55156 42887 1007.75774 55 346 - 983.46146 - 40.0 3470s 55334 43047 1005.45400 52 359 - 983.46511 - 40.0 3475s 55487 43160 1007.95947 49 343 - 983.46528 - 40.0 3480s 55680 43290 1005.90020 58 337 - 983.46628 - 40.0 3485s 55846 43418 990.43300 42 407 - 983.46628 - 40.0 3490s 55998 43558 1056.14765 111 353 - 983.46628 - 40.1 3495s 56181 43693 996.28921 55 340 - 983.46689 - 40.1 3500s 56372 43840 1016.48881 67 352 - 983.46880 - 40.1 3505s 56582 43983 990.43194 38 391 - 983.46938 - 40.1 3510s 56737 44115 997.31224 46 383 - 983.46964 - 40.1 3515s 56830 44182 1046.10819 87 358 - 983.46964 - 40.2 3520s 56896 44219 998.01862 57 358 - 983.47224 - 40.3 3525s 57176 44455 1054.50581 96 183 - 983.47583 - 40.2 3530s 57292 44544 993.51603 43 374 - 983.47829 - 40.3 3535s 57406 44633 999.51671 48 383 - 983.47844 - 40.3 3540s 57521 44720 1003.90443 51 355 - 983.47922 - 40.4 3545s 57718 44885 1007.61732 68 355 - 983.47970 - 40.4 3550s 57869 45014 1052.66124 78 345 - 983.47973 - 40.5 3555s 58096 45192 1059.52225 111 346 - 983.47973 - 40.4 3560s 58305 45350 999.00200 46 378 - 983.48096 - 40.4 3565s 58446 45478 1019.98821 81 344 - 983.49126 - 40.4 3570s 58615 45606 999.59203 57 343 - 983.49271 - 40.5 3575s 58685 45676 1006.04522 90 355 - 983.49271 - 40.6 3580s 58823 45787 1015.21506 77 363 - 983.49612 - 40.6 3585s 58983 45904 996.26822 55 331 - 983.49960 - 40.7 3590s 59170 46047 1007.04523 78 329 - 983.50054 - 40.7 3595s Cutting planes: Learned: 49 Gomory: 57 Cover: 166 Implied bound: 8 Clique: 34 MIR: 707 GUB cover: 114 Zero half: 260 Explored 59265 nodes (2416765 simplex iterations) in 3600.00 seconds Thread count was 1 (of 16 available processors) Time limit reached Best objective -, best bound 9.840000000000e+02, gap -