Gurobi 5.0.1 (linux64) logging started Tue Dec 25 04:22:08 2012 Optimize a model with 40802 rows, 40401 columns and 244908 nonzeros Presolve removed 18335 rows and 19323 columns Presolve time: 0.58s Presolved: 22467 rows, 21078 columns, 112767 nonzeros Variable types: 199 continuous, 20879 integer (20879 binary) Root relaxation: objective 8.176684e+02, 1802 iterations, 0.24 seconds Nodes | Current Node | Objective Bounds | Work Expl Unexpl | Obj Depth IntInf | Incumbent BestBd Gap | It/Node Time 0 0 817.66836 0 399 - 817.66836 - - 1s 0 0 857.73987 0 346 - 857.73987 - - 2s 0 0 861.16994 0 405 - 861.16994 - - 2s 0 0 864.06329 0 348 - 864.06329 - - 3s 0 0 864.88587 0 395 - 864.88587 - - 3s 0 0 865.60968 0 358 - 865.60968 - - 3s 0 0 865.91565 0 368 - 865.91565 - - 4s 0 0 865.94916 0 339 - 865.94916 - - 4s 0 0 866.29653 0 342 - 866.29653 - - 4s 0 0 866.29653 0 347 - 866.29653 - - 5s 0 0 866.29653 0 289 - 866.29653 - - 5s 0 0 866.31438 0 294 - 866.31438 - - 6s 0 0 866.31438 0 278 - 866.31438 - - 6s 0 0 866.31438 0 300 - 866.31438 - - 7s 0 0 866.31438 0 300 - 866.31438 - - 8s 0 2 866.60605 0 282 - 866.60605 - - 11s 225 184 917.55208 39 287 - 870.83399 - 20.2 15s 601 472 916.10408 38 300 - 871.08105 - 18.6 23s 603 473 912.13168 27 421 - 871.08105 - 18.6 50s 604 474 890.40668 23 299 - 871.08105 - 18.6 65s 605 475 912.13168 27 369 - 871.08105 - 18.5 92s 606 475 896.37541 28 412 - 872.57296 - 18.5 120s 607 476 921.10216 45 378 - 874.60182 - 18.5 143s 608 477 927.68876 41 395 - 876.51790 - 18.4 163s 609 477 886.31438 12 427 - 878.92350 - 18.4 190s 610 478 890.40668 23 447 - 880.47878 - 18.4 210s 611 479 892.75788 20 461 - 881.75157 - 18.3 243s 612 479 912.13168 27 443 - 882.21805 - 18.3 268s 613 480 899.09189 29 443 - 882.54797 - 18.3 297s 614 481 916.10408 38 475 - 882.94081 - 18.3 335s 615 481 883.98105 5 464 - 883.75958 - 18.2 375s 616 482 886.66438 20 439 - 884.31997 - 18.2 403s 617 483 913.09338 29 465 - 885.50565 - 18.2 431s 618 483 912.13168 27 448 - 886.22234 - 18.1 460s 619 484 900.28626 32 417 - 886.37506 - 18.1 489s 620 485 892.75788 20 423 - 886.69572 - 18.1 515s 621 485 900.28626 32 431 - 886.95097 - 18.0 543s 622 486 915.00906 32 428 - 887.07593 - 18.0 574s 623 487 887.17735 12 435 - 887.17735 - 18.0 615s 624 487 890.40668 23 448 - 887.45436 - 18.0 636s 625 488 915.62458 36 445 - 887.57678 - 17.9 663s 626 489 899.09189 29 448 - 887.59859 - 17.9 690s 627 489 921.10216 45 420 - 887.75840 - 17.9 714s 628 490 887.80666 5 442 - 887.80666 - 17.8 738s 629 491 901.25175 41 418 - 887.90372 - 17.8 762s 630 491 916.10408 38 458 - 887.97155 - 17.8 798s 631 492 892.37062 16 449 - 888.03427 - 17.8 824s 632 493 890.40668 23 458 - 888.10779 - 17.7 855s 633 493 892.37062 16 448 - 888.34592 - 17.7 885s 634 494 888.50779 20 465 - 888.50779 - 17.7 913s 635 495 888.67329 5 446 - 888.67329 - 17.7 939s 636 495 921.10216 45 461 - 888.93282 - 17.6 969s 637 496 927.68876 41 467 - 889.28220 - 17.6 996s 638 497 915.62458 36 420 - 889.62076 - 17.6 1023s 639 497 897.66438 35 424 - 889.73683 - 17.5 1042s 640 498 889.90339 20 425 - 889.90339 - 17.5 1071s 641 499 897.24772 29 440 - 890.19136 - 17.5 1101s 642 499 890.23452 5 474 - 890.23452 - 17.5 1133s 643 500 900.28626 32 415 - 890.31736 - 17.4 1166s 644 501 890.51454 23 495 - 890.51454 - 17.4 1196s 645 501 894.43514 28 450 - 890.60697 - 17.4 1225s 646 502 896.37541 28 443 - 890.88654 - 17.3 1249s 647 503 913.09338 29 476 - 891.39794 - 17.3 1281s 648 503 891.49976 12 454 - 891.49976 - 17.3 1303s 649 504 891.84462 20 454 - 891.84462 - 17.3 1335s 650 505 892.75788 20 491 - 891.95129 - 17.2 1374s 651 505 896.37541 28 499 - 892.01338 - 17.2 1413s 652 506 927.68876 41 419 - 892.36290 - 17.2 1436s 653 507 896.37541 28 484 - 892.50712 - 17.2 1468s 654 507 921.10216 45 510 - 892.61314 - 17.1 1515s 655 508 927.68876 41 493 - 892.66117 - 17.1 1556s 656 509 896.37541 28 489 - 892.85296 - 17.1 1602s 657 509 892.91080 23 490 - 892.91080 - 17.1 1642s 658 510 915.62458 36 533 - 893.03667 - 17.0 1724s 659 511 915.00906 32 497 - 893.18551 - 17.0 1758s 660 511 893.18984 16 530 - 893.18984 - 17.0 1781s 661 512 896.37541 28 523 - 893.18984 - 17.0 1799s 664 515 893.23513 20 300 - 893.23513 - 89.4 1822s 666 516 900.28626 32 419 - 893.23513 - 89.2 1875s 667 517 913.09338 29 396 - 893.23513 - 89.0 1909s 668 518 897.66438 35 424 - 893.23513 - 88.9 1950s 669 518 915.00906 32 469 - 893.23513 - 88.8 1991s 670 519 913.09338 29 458 - 893.37381 - 88.6 2035s 671 520 896.37541 28 505 - 893.47078 - 88.5 2074s 672 520 913.09338 29 459 - 893.49993 - 88.4 2109s 673 521 900.28626 32 461 - 893.52504 - 88.3 2171s 674 522 897.24772 29 503 - 893.61533 - 88.1 2217s 675 522 901.25175 41 511 - 893.63930 - 88.0 2272s 676 523 921.10216 45 525 - 893.64268 - 87.9 2301s 677 524 893.64268 20 518 - 893.64268 - 87.7 2328s 678 524 915.62458 36 518 - 893.64268 - 87.6 2349s 679 527 893.68796 28 541 - 893.68796 - 101 2350s 755 554 912.01879 56 313 - 893.71752 - 94.8 2355s 904 649 938.87762 131 228 - 893.71752 - 86.0 2360s 994 697 909.89837 68 269 - 897.90737 - 82.7 2365s 1212 752 910.02524 44 340 - 900.11145 - 72.4 2370s 1410 884 927.34873 147 202 - 900.11145 - 66.1 2375s 1589 984 927.28154 111 260 - 901.66927 - 62.5 2380s 1784 1070 914.07974 36 508 - 902.96350 - 58.8 2385s 1986 1143 914.86216 46 328 - 904.37777 - 56.0 2390s 2165 1234 916.04972 62 288 - 904.44658 - 54.8 2395s 2331 1360 931.06754 135 198 - 904.44658 - 53.3 2400s 2532 1492 926.44480 96 328 - 904.74227 - 51.4 2405s 2704 1646 910.48177 58 332 - 904.81592 - 50.6 2410s 2861 1777 908.42490 52 378 - 904.84647 - 49.7 2415s 3033 1947 939.79794 148 216 - 904.84647 - 48.6 2420s 3162 2040 916.67662 67 284 - 904.89161 - 48.4 2425s 3319 2183 930.71300 92 274 - 904.90553 - 48.1 2430s 3489 2321 921.56262 79 243 - 904.95447 - 47.7 2435s 3620 2425 906.62828 44 383 - 904.97475 - 47.7 2440s 3718 2487 infeasible 56 - 904.97475 - 48.1 2445s 3837 2588 912.98625 61 296 - 905.01359 - 48.1 2450s 3990 2717 infeasible 90 - 905.03706 - 47.9 2455s 4114 2821 912.28486 59 338 - 905.07155 - 47.8 2460s 4269 2950 infeasible 103 - 905.07747 - 47.5 2465s 4420 3054 910.38119 47 421 - 905.10989 - 47.3 2470s 4568 3201 926.58899 115 157 - 905.10989 - 47.2 2475s 4753 3371 958.22507 208 101 - 905.10989 - 46.4 2480s 4968 3528 914.16212 49 387 - 905.16605 - 45.5 2485s 5137 3673 914.39623 56 306 - 905.16828 - 45.2 2490s 5331 3827 infeasible 96 - 905.18101 - 44.7 2495s 5487 3970 926.17523 101 170 - 905.21369 - 44.6 2500s 5673 4124 908.05610 42 351 - 905.25339 - 44.2 2505s 5821 4258 920.34814 57 377 - 905.26306 - 44.1 2510s 5962 4387 929.40920 98 277 - 905.27773 - 44.1 2515s 6110 4502 924.06625 49 408 - 905.29028 - 43.9 2520s 6259 4625 922.42798 62 315 - 905.33514 - 43.8 2525s 6372 4702 909.67875 50 358 - 905.37068 - 43.8 2530s 6495 4805 913.97487 70 258 - 905.37126 - 43.8 2535s 6663 4971 928.93582 166 178 - 905.37126 - 43.5 2540s 6843 5121 925.26757 110 191 - 905.37743 - 43.2 2545s 7031 5305 infeasible 210 - 905.37743 - 43.0 2550s 7209 5449 929.01512 130 229 - 905.40910 - 42.8 2555s 7388 5603 921.17847 79 224 - 905.43539 - 42.5 2560s 7506 5697 926.48527 78 181 - 905.44686 - 42.6 2565s 7678 5826 982.09918 138 196 - 905.44686 - 42.6 2570s 7867 5971 949.69592 80 291 - 905.49220 - 42.4 2575s 7988 6084 930.00547 94 183 - 905.50501 - 42.7 2580s 8152 6235 916.00178 77 279 - 905.51628 - 42.6 2585s 8321 6318 906.09833 42 360 - 905.56430 - 42.5 2590s 8512 6485 915.53481 71 293 - 905.57062 - 42.2 2595s 8682 6625 912.58884 66 294 - 905.57727 - 42.1 2600s 8850 6771 922.18583 66 301 - 905.59463 - 42.0 2605s 9032 6921 920.64165 76 269 - 905.61749 - 41.9 2610s 9213 7064 946.14527 78 265 - 905.64385 - 41.8 2615s 9398 7227 919.98109 81 347 - 905.71485 - 41.7 2620s 9556 7373 916.54711 66 293 - 905.71559 - 41.6 2625s 9683 7476 905.72616 43 439 - 905.71667 - 41.7 2630s 9836 7596 921.90220 71 273 - 905.71780 - 41.8 2635s 10001 7761 946.01104 151 234 - 905.71780 - 41.7 2640s 10171 7900 915.60089 59 335 - 905.73265 - 41.6 2645s 10238 7966 931.95471 88 322 - 905.73265 - 41.7 2650s 10374 8088 929.31587 85 282 - 905.73750 - 41.8 2655s 10546 8248 919.53053 60 271 - 905.74897 - 41.6 2660s 10706 8367 910.94427 53 419 - 905.80736 - 41.6 2665s 10891 8537 926.26872 109 278 - 905.81013 - 41.4 2670s 11067 8686 963.59256 199 165 - 905.81013 - 41.2 2675s 11229 8836 926.65686 99 299 - 905.81285 - 41.1 2680s 11401 8994 956.47371 190 196 - 905.81285 - 40.9 2685s 11578 9088 905.96736 43 393 - 905.81343 - 40.9 2690s 11740 9247 938.70267 136 219 - 905.81343 - 40.8 2695s 11915 9394 907.56448 46 385 - 905.81373 - 40.6 2700s 12037 9516 936.65263 96 286 - 905.81373 - 40.7 2705s 12207 9661 939.58079 89 262 - 905.87520 - 40.7 2710s 12371 9797 930.10466 126 174 - 905.88357 - 40.6 2715s 12541 9957 962.93790 204 223 - 905.88357 - 40.5 2720s 12760 10077 911.61049 53 359 - 905.90057 - 40.2 2725s 12937 10227 909.84108 54 314 - 905.93143 - 40.2 2730s 13045 10321 935.97462 70 251 - 905.95555 - 40.4 2735s 13143 10401 910.92061 46 327 - 905.96880 - 40.5 2740s 13303 10530 924.88685 92 292 - 905.98560 - 40.4 2745s 13451 10658 926.57789 99 202 - 905.99328 - 40.4 2750s 13580 10769 926.50143 92 257 - 905.99951 - 40.4 2755s 13723 10912 961.71925 149 200 - 905.99951 - 40.4 2760s 13871 11048 937.53649 99 291 - 906.02355 - 40.5 2765s 13997 11148 917.26124 67 264 - 906.03614 - 40.4 2770s 14148 11287 908.39287 45 371 - 906.03843 - 40.5 2775s 14297 11426 927.39738 89 272 - 906.06098 - 40.5 2780s 14457 11573 925.52967 78 308 - 906.06361 - 40.5 2785s 14610 11714 914.09704 52 420 - 906.06595 - 40.5 2790s 14765 11841 911.97546 42 356 - 906.07093 - 40.4 2795s 14919 11979 928.47474 72 335 - 906.07517 - 40.4 2800s 14998 12052 949.32516 101 272 - 906.07517 - 40.6 2805s 15159 12205 972.27785 175 190 - 906.07517 - 40.5 2810s 15321 12342 932.34580 116 231 - 906.07716 - 40.5 2815s 15495 12491 910.22759 50 374 - 906.08200 - 40.4 2820s 15622 12603 913.11787 53 339 - 906.09267 - 40.5 2825s 15801 12782 944.64657 160 216 - 906.09267 - 40.4 2830s 15943 12898 932.30999 79 295 - 906.09455 - 40.5 2835s 16043 12972 912.80379 55 357 - 906.10328 - 40.5 2840s 16177 13104 943.21703 124 220 - 906.10328 - 40.6 2845s 16331 13222 infeasible 82 - 906.12146 - 40.6 2850s 16489 13360 923.20915 81 215 - 906.12813 - 40.6 2855s 16652 13498 924.13526 62 297 - 906.15050 - 40.5 2860s 16778 13562 954.06775 92 301 - 906.15050 - 40.6 2865s 16908 13641 930.17531 97 294 - 906.16684 - 40.7 2870s 17030 13737 925.14572 67 291 - 906.17520 - 40.8 2875s 17190 13871 924.22408 89 308 - 906.18858 - 40.7 2880s 17333 13991 931.60462 77 357 - 906.19760 - 40.8 2885s 17510 14132 910.85073 49 374 - 906.20604 - 40.7 2890s 17661 14275 941.50445 137 245 - 906.20604 - 40.6 2895s 17802 14376 942.87696 80 329 - 906.21774 - 40.7 2900s 17945 14499 926.76114 124 296 - 906.25075 - 40.6 2905s 18081 14602 919.61144 81 292 - 906.26007 - 40.6 2910s 18245 14759 960.96839 151 184 - 906.26007 - 40.6 2915s 18440 14915 922.05537 80 334 - 906.26304 - 40.5 2920s 18595 15056 961.26025 161 264 - 906.26304 - 40.5 2925s 18730 15177 928.62669 106 277 - 906.26871 - 40.5 2930s 18858 15286 917.03874 54 345 - 906.27086 - 40.6 2935s 18999 15427 944.13316 122 212 - 906.27086 - 40.6 2940s 19150 15557 929.88623 81 309 - 906.27380 - 40.6 2945s 19270 15662 930.46826 74 318 - 906.28330 - 40.8 2950s 19419 15794 934.43186 84 271 - 906.28623 - 40.8 2955s 19517 15890 955.88336 126 280 - 906.28623 - 41.0 2960s 19681 16044 939.68256 109 260 - 906.28722 - 40.9 2965s 19803 16140 914.09810 57 417 - 906.30763 - 41.0 2970s 19941 16264 914.30600 63 312 - 906.31032 - 41.0 2975s 20079 16398 935.07912 141 203 - 906.31032 - 41.1 2980s 20219 16508 928.02546 83 316 - 906.31304 - 41.1 2985s 20339 16622 infeasible 112 - 906.31304 - 41.2 2990s 20402 16671 927.31924 70 272 - 906.31525 - 41.2 2996s 20508 16771 950.99874 112 189 - 906.31525 - 41.3 3000s 20692 16922 926.57190 79 304 - 906.31811 - 41.2 3005s 20804 17026 934.57872 92 311 - 906.32752 - 41.4 3010s 20921 17133 928.00441 80 342 - 906.32913 - 41.4 3015s 21024 17234 950.48612 118 276 - 906.32913 - 41.5 3020s 21193 17401 976.85273 190 220 - 906.32913 - 41.5 3025s 21418 17603 1022.90467 276 148 - 906.32913 - 41.3 3030s 21594 17734 941.43270 83 285 - 906.33048 - 41.2 3035s 21783 17888 917.92251 62 307 - 906.33076 - 41.1 3040s 21917 18010 918.00816 65 328 - 906.34798 - 41.1 3045s 22009 18095 948.49579 106 205 - 906.34798 - 41.2 3050s 22179 18222 918.97799 66 270 - 906.35192 - 41.2 3055s 22351 18323 920.30890 61 323 - 906.35192 - 41.2 3060s 22475 18447 947.33992 113 219 - 906.35192 - 41.3 3065s 22644 18566 924.53780 63 335 - 906.35217 - 41.3 3070s 22772 18690 954.24612 125 254 - 906.35217 - 41.3 3075s 22983 18825 910.65457 51 385 - 906.35936 - 41.2 3080s 23126 18968 950.89956 118 212 - 906.35936 - 41.2 3085s 23296 19117 930.81387 116 227 - 906.35988 - 41.2 3090s 23510 19293 918.27814 70 292 - 906.37127 - 41.1 3095s 23651 19424 949.97305 126 259 - 906.37127 - 41.1 3100s 23863 19576 907.21468 48 286 - 906.37823 - 40.9 3105s 24007 19706 945.02659 119 290 - 906.37823 - 40.9 3110s 24174 19861 933.56392 120 236 - 906.38246 - 40.8 3115s 24319 19956 922.51227 52 304 - 906.38859 - 40.8 3120s 24451 20078 930.62839 108 235 - 906.39219 - 40.8 3125s 24605 20202 923.86577 55 324 - 906.40821 - 40.8 3130s 24709 20291 921.00863 61 372 - 906.41667 - 40.9 3135s 24852 20424 924.35937 70 298 - 906.42442 - 40.9 3140s 24945 20507 928.77540 75 310 - 906.43424 - 41.0 3145s 25046 20608 940.39013 98 230 - 906.43424 - 41.1 3150s 25223 20773 965.80884 160 241 - 906.43424 - 41.1 3155s 25365 20885 infeasible 210 - 906.43424 - 41.1 3160s 25508 21028 935.40465 126 210 - 906.43452 - 41.1 3165s 25695 21151 925.92183 89 309 - 906.43913 - 41.0 3170s 25825 21277 959.38218 146 270 - 906.43913 - 41.1 3175s 26024 21419 infeasible 223 - 906.43913 - 41.0 3180s 26181 21542 912.34197 61 288 - 906.44359 - 41.0 3185s 26378 21729 948.75145 161 146 - 906.44359 - 40.9 3190s 26565 21890 931.84327 70 336 - 906.45021 - 40.8 3195s 26707 22018 929.97086 71 307 - 906.45169 - 40.8 3200s 26833 22120 908.87645 51 315 - 906.45900 - 40.9 3205s 26963 22222 906.56060 46 367 - 906.45903 - 40.9 3210s 27086 22317 921.19699 63 318 - 906.46758 - 41.0 3215s 27230 22445 913.91057 61 379 - 906.46857 - 41.0 3220s 27356 22569 950.54802 119 289 - 906.46857 - 41.1 3225s 27560 22759 1002.67287 230 165 - 906.46857 - 41.0 3230s 27772 22916 931.61784 80 280 - 906.47658 - 40.8 3235s 27881 23011 928.27274 80 288 - 906.49070 - 40.9 3240s 28034 23160 956.79464 146 182 - 906.49070 - 40.9 3245s 28256 23344 infeasible 252 - 906.49070 - 40.8 3250s 28381 23458 949.09435 103 168 - 906.49620 - 40.9 3255s 28618 23655 911.75422 54 390 - 906.49864 - 40.7 3260s 28751 23788 941.00681 119 218 - 906.49864 - 40.7 3265s 28961 23977 1003.57108 235 174 - 906.49864 - 40.6 3270s 29113 24079 929.52291 79 259 - 906.50684 - 40.6 3275s 29293 24238 908.38795 47 373 - 906.50813 - 40.6 3280s 29422 24349 921.72703 69 263 - 906.51174 - 40.7 3285s 29553 24466 927.08448 83 293 - 906.51378 - 40.7 3290s 29770 24650 918.92460 66 270 - 906.52335 - 40.6 3295s 29902 24766 931.15966 83 273 - 906.52821 - 40.7 3300s 30047 24889 914.69853 62 341 - 906.53155 - 40.7 3305s 30183 25017 936.25411 114 276 - 906.53155 - 40.7 3310s 30354 25188 961.59423 163 184 - 906.53155 - 40.7 3315s 30518 25313 931.74130 82 267 - 906.53220 - 40.7 3320s 30603 25394 954.94306 120 222 - 906.53220 - 40.7 3325s 30732 25507 937.07593 104 194 - 906.53662 - 40.7 3330s 30884 25629 932.49519 50 362 - 906.54263 - 40.7 3335s 30977 25720 960.77605 92 299 - 906.54263 - 40.8 3340s 31103 25818 1031.23777 139 203 - 906.54263 - 40.7 3345s 31257 25951 958.74190 103 218 - 906.54467 - 40.8 3350s 31450 26126 928.92332 78 224 - 906.54485 - 40.7 3355s 31649 26290 911.22707 45 380 - 906.54572 - 40.6 3360s 31776 26409 960.80504 109 156 - 906.54572 - 40.7 3365s 31914 26507 927.48385 66 256 - 906.54790 - 40.7 3370s 32081 26646 918.29961 60 305 - 906.55928 - 40.7 3375s 32229 26779 942.66527 88 326 - 906.56060 - 40.7 3380s 32431 26959 980.47251 162 156 - 906.56060 - 40.6 3385s 32671 27146 912.95334 53 360 - 906.56148 - 40.5 3390s 32806 27276 949.40462 115 217 - 906.56148 - 40.5 3395s 32952 27392 938.85557 73 266 - 906.56380 - 40.5 3400s 33068 27478 953.69700 90 320 - 906.56726 - 40.5 3405s 33188 27574 924.39179 67 333 - 906.57296 - 40.6 3410s 33359 27741 963.69773 129 250 - 906.57296 - 40.5 3415s 33479 27838 941.95855 91 230 - 906.57411 - 40.6 3420s 33669 28014 984.41565 186 212 - 906.57411 - 40.5 3425s 33831 28129 911.32829 51 316 - 906.58941 - 40.5 3430s 33939 28235 949.23205 94 251 - 906.58941 - 40.6 3435s 34029 28305 923.35795 63 301 - 906.59798 - 40.6 3440s 34156 28413 993.29440 123 239 - 906.59798 - 40.7 3445s 34361 28548 infeasible 197 - 906.59798 - 40.6 3450s 34539 28687 955.46654 108 249 - 906.60358 - 40.6 3455s 34678 28814 927.07796 78 306 - 906.60936 - 40.6 3460s 34823 28935 906.64219 45 365 - 906.61848 - 40.6 3465s 34898 29010 922.82471 67 367 - 906.61848 - 40.7 3470s 35021 29130 960.13495 98 284 - 906.61848 - 40.7 3475s 35165 29248 924.79418 78 287 - 906.61962 - 40.7 3480s 35325 29378 913.66050 56 305 - 906.62378 - 40.7 3485s 35457 29510 942.92219 104 268 - 906.62378 - 40.7 3490s 35573 29614 935.05625 75 309 - 906.62922 - 40.8 3495s 35719 29740 952.05261 145 165 - 906.62922 - 40.7 3500s 35892 29847 907.24500 52 349 - 906.63079 - 40.7 3505s 36018 29965 921.98239 64 349 - 906.64224 - 40.7 3510s 36174 30101 infeasible 93 - 906.64631 - 40.7 3515s 36292 30199 909.37432 51 355 - 906.65606 - 40.8 3520s 36423 30312 930.44446 67 352 - 906.65636 - 40.8 3525s 36558 30433 913.56497 56 334 - 906.65637 - 40.8 3530s 36688 30545 918.21076 74 307 - 906.65707 - 40.9 3535s 36860 30713 959.43275 143 223 - 906.65707 - 40.8 3540s 37027 30818 913.22767 54 268 - 906.65933 - 40.8 3545s 37166 30939 934.01379 73 240 - 906.66747 - 40.8 3550s 37350 31105 917.13074 66 307 - 906.66747 - 40.8 3555s 37463 31208 927.17774 75 260 - 906.67233 - 40.8 3560s 37607 31335 928.65387 85 296 - 906.67723 - 40.9 3565s 37759 31462 939.28682 92 268 - 906.67751 - 40.9 3570s 37962 31623 907.92507 48 276 - 906.67786 - 40.8 3575s 38110 31771 950.56150 118 145 - 906.67786 - 40.7 3580s 38318 31970 992.28659 214 134 - 906.67786 - 40.6 3585s 38532 32138 924.47177 75 315 - 906.67927 - 40.5 3590s 38700 32294 934.94141 115 217 - 906.68579 - 40.5 3595s Cutting planes: Learned: 45 Gomory: 26 Cover: 176 Implied bound: 4 Clique: 31 MIR: 537 GUB cover: 74 Zero half: 164 Explored 38872 nodes (1582244 simplex iterations) in 3600.00 seconds Thread count was 1 (of 16 available processors) Time limit reached Best objective -, best bound 9.070000000000e+02, gap -