Gurobi 5.0.1 (linux64) logging started Sat Dec 22 01:32:38 2012 Optimize a model with 10202 rows, 10201 columns and 46128 nonzeros Presolve removed 8779 rows and 5295 columns Presolve time: 0.10s Presolved: 1423 rows, 4906 columns, 14576 nonzeros Variable types: 93 continuous, 4813 integer (4813 binary) Root relaxation: objective 6.724500e+02, 469 iterations, 0.01 seconds Nodes | Current Node | Objective Bounds | Work Expl Unexpl | Obj Depth IntInf | Incumbent BestBd Gap | It/Node Time 0 0 672.45003 0 144 - 672.45003 - - 0s 0 0 710.08596 0 184 - 710.08596 - - 0s 0 0 714.86364 0 195 - 714.86364 - - 0s 0 0 721.62500 0 187 - 721.62500 - - 0s 0 0 724.12500 0 181 - 724.12500 - - 0s 0 0 725.75000 0 188 - 725.75000 - - 0s 0 0 727.04167 0 197 - 727.04167 - - 0s 0 0 727.76667 0 187 - 727.76667 - - 0s 0 0 728.16667 0 204 - 728.16667 - - 0s 0 0 728.16667 0 155 - 728.16667 - - 0s 0 2 729.16667 0 155 - 729.16667 - - 0s 610 483 769.98675 38 167 - 740.65024 - 9.9 5s 625 493 768.16205 84 166 - 743.52445 - 9.6 10s 650 513 745.88594 26 129 - 744.08489 - 22.0 15s 1649 910 768.99035 40 126 - 745.53584 - 24.7 20s 2743 1572 780.11726 54 85 - 746.14683 - 25.3 25s 3781 2345 infeasible 63 - 746.69150 - 26.2 30s 4883 3014 786.84431 53 115 - 747.39787 - 26.5 35s 5982 3658 763.02233 39 87 - 747.84003 - 26.8 40s 7127 4306 750.98482 32 151 - 748.38573 - 26.5 45s 8309 4913 773.96963 40 161 - 748.84605 - 26.1 50s 9424 5495 765.48766 33 86 - 749.08316 - 26.2 55s 10403 6031 infeasible 41 - 749.43396 - 26.2 60s 11512 6604 785.10512 47 110 - 749.61792 - 26.3 65s 12555 7161 787.25551 56 118 - 749.82887 - 26.6 70s 13616 7772 825.04451 79 128 - 749.96781 - 26.7 75s 14648 8319 816.42271 54 124 - 750.09142 - 27.0 80s 15782 8904 762.71557 42 167 - 750.30927 - 26.9 85s 16861 9469 810.34627 59 128 - 750.48891 - 26.9 90s 17946 10001 766.51265 36 167 - 750.77600 - 26.9 95s 19094 10554 788.93620 67 70 - 750.91410 - 26.9 100s 20166 11125 796.40686 54 111 - 751.07908 - 26.9 105s 21073 11689 811.77481 65 127 - 751.18978 - 27.0 110s 22245 12276 818.71926 64 123 - 751.34633 - 26.9 115s 23381 12866 infeasible 49 - 751.53312 - 26.8 120s 24499 13491 infeasible 41 - 751.62074 - 26.8 125s 25501 14033 783.64788 50 164 - 751.74537 - 27.0 130s 26695 14704 infeasible 60 - 751.90265 - 26.8 135s 27791 15258 infeasible 50 - 752.03312 - 26.8 140s 28913 15907 795.49718 63 105 - 752.14001 - 26.7 145s 29999 16448 infeasible 47 - 752.23766 - 26.8 150s 31049 16959 781.18453 61 122 - 752.30519 - 26.7 155s 32186 17517 803.59082 41 157 - 752.39825 - 26.7 160s 33275 18100 784.72168 59 115 - 752.47328 - 26.7 165s 34381 18666 825.72312 76 72 - 752.57893 - 26.7 170s 35530 19274 789.80708 63 154 - 752.67657 - 26.6 175s 36680 19868 752.84479 31 154 - 752.77435 - 26.6 180s 37767 20462 infeasible 53 - 752.84021 - 26.6 185s 38921 21053 763.02833 50 64 - 752.93256 - 26.6 190s 40256 21793 769.36339 43 169 - 753.01783 - 26.4 195s 40804 22131 770.24834 47 140 - 753.05297 - 26.4 208s 41206 22369 800.42857 79 19 - 753.07098 - 26.4 210s 42523 22978 755.37160 34 171 - 753.18574 - 26.3 215s 43906 23691 infeasible 55 - 753.27771 - 26.3 220s 45333 24397 777.79496 42 124 - 753.39372 - 26.2 225s 46713 25090 761.10686 34 122 - 753.47252 - 26.1 230s 48071 25753 754.33293 38 134 - 753.57231 - 26.1 235s 49535 26462 789.34676 47 170 - 753.64402 - 26.0 240s 50847 27116 789.21836 44 156 - 753.73098 - 26.0 245s 52146 27785 809.89949 66 146 - 753.81408 - 25.9 250s 53489 28376 778.56938 43 113 - 753.91505 - 25.9 255s 54835 29148 790.70832 46 147 - 753.97437 - 25.9 260s 56166 29784 767.96526 44 172 - 754.06383 - 25.9 265s 57499 30459 799.00790 60 140 - 754.14590 - 25.9 270s 58818 31188 infeasible 65 - 754.21542 - 25.9 275s 60272 31955 780.40396 89 40 - 754.31357 - 25.9 280s 61581 32700 760.45037 39 187 - 754.36764 - 25.8 285s 62926 33417 764.57364 36 124 - 754.41753 - 25.7 290s 64347 34255 776.49640 48 84 - 754.47518 - 25.7 295s 65771 35063 785.02941 79 29 - 754.53529 - 25.6 300s 67139 35899 759.60511 42 131 - 754.57644 - 25.6 305s 68550 36712 infeasible 53 - 754.64433 - 25.6 310s 69954 37392 758.79971 35 165 - 754.70756 - 25.5 315s 71407 38090 761.96556 39 152 - 754.78242 - 25.5 320s 72777 38873 791.52384 69 71 - 754.83528 - 25.4 325s *72875 27083 75 795.0000000 754.83989 5.05% 25.4 325s H73000 17051 779.0000000 754.84845 3.10% 25.4 325s 73001 17052 767.14560 49 155 779.00000 754.84845 3.10% 25.4 346s 73216 17121 767.43172 44 108 779.00000 754.84845 3.10% 25.5 350s 74117 17145 759.17483 45 162 779.00000 754.84845 3.10% 25.6 355s 75036 17185 763.41869 43 126 779.00000 754.84845 3.10% 25.8 360s H75510 16381 778.0000000 754.84845 2.98% 25.8 363s 75823 16390 771.08383 53 156 778.00000 754.84845 2.98% 25.9 365s 76847 16411 776.22218 53 111 778.00000 754.84845 2.98% 26.0 370s 78026 16568 760.49235 49 191 778.00000 754.84845 2.98% 26.0 375s 79263 16793 758.18801 43 125 778.00000 755.12749 2.94% 26.0 380s H79556 15423 771.0000000 755.21204 2.05% 26.0 382s 80143 15379 766.06832 48 101 771.00000 755.53412 2.01% 26.0 385s 81287 15380 762.24857 58 59 771.00000 756.21731 1.92% 26.0 390s 82351 15304 766.36395 53 91 771.00000 756.86832 1.83% 26.1 395s 83485 15201 759.15903 44 201 771.00000 757.33192 1.77% 26.1 400s 84631 15156 769.99456 53 161 771.00000 757.65177 1.73% 26.1 405s 85862 15155 766.45131 63 71 771.00000 758.03325 1.68% 26.1 410s 87077 15187 758.51203 42 90 771.00000 758.25399 1.65% 26.0 415s 88389 15281 760.16375 58 66 771.00000 758.35144 1.64% 25.9 420s 89801 15355 769.72374 64 65 771.00000 758.52468 1.62% 25.9 425s 91200 15373 767.32755 56 79 771.00000 758.69992 1.60% 25.8 430s 92236 15367 759.66962 45 92 771.00000 758.84936 1.58% 25.7 435s 93628 15388 767.24873 54 107 771.00000 758.96727 1.56% 25.7 440s 95072 15479 759.98796 50 91 771.00000 759.03325 1.55% 25.6 445s 96552 15505 cutoff 54 771.00000 759.12077 1.54% 25.5 450s 97432 15540 764.37397 57 74 771.00000 759.18167 1.53% 25.4 456s 98489 15517 766.26053 52 185 771.00000 759.26053 1.52% 25.4 460s 100043 15559 768.37180 61 85 771.00000 759.30598 1.52% 25.3 465s 101873 15590 769.30598 57 79 771.00000 759.36232 1.51% 25.2 470s 103677 15559 cutoff 63 771.00000 759.45732 1.50% 25.1 475s 105438 15516 760.37397 51 76 771.00000 759.55937 1.48% 25.0 480s 107187 15431 761.34508 52 88 771.00000 759.65859 1.47% 24.9 485s 108980 15388 767.81230 55 90 771.00000 759.72812 1.46% 24.8 490s 110785 15312 763.39134 59 70 771.00000 759.80485 1.45% 24.7 495s 112532 15203 767.57304 64 47 771.00000 759.89576 1.44% 24.6 500s 114255 15094 761.66861 62 55 771.00000 759.99251 1.43% 24.6 505s 116022 14969 767.13807 54 68 771.00000 760.05922 1.42% 24.5 510s 117849 14779 765.51505 47 179 771.00000 760.12730 1.41% 24.4 515s 119092 14650 768.56406 64 49 771.00000 760.18469 1.40% 24.4 520s 120904 15015 769.71772 59 36 771.00000 760.25084 1.39% 24.3 525s 122608 15471 760.79136 71 80 771.00000 760.29884 1.39% 24.2 530s 124560 15990 769.86394 68 48 771.00000 760.34330 1.38% 24.2 535s 126443 16456 cutoff 61 771.00000 760.40499 1.37% 24.1 540s 128263 16835 763.31527 60 62 771.00000 760.47300 1.37% 24.0 545s 130061 17217 767.89046 62 61 771.00000 760.53756 1.36% 24.0 550s 131342 17489 762.51159 53 81 771.00000 760.58080 1.35% 23.9 555s 132909 17840 762.65028 63 61 771.00000 760.63879 1.34% 23.9 560s 134787 18196 765.03636 63 58 771.00000 760.70054 1.34% 23.8 565s 136621 18564 cutoff 50 771.00000 760.74538 1.33% 23.8 570s 138439 18887 768.10628 70 28 771.00000 760.80598 1.32% 23.7 575s 140371 19354 769.30242 55 88 771.00000 760.85144 1.32% 23.6 580s 142251 19783 768.45482 65 59 771.00000 760.90672 1.31% 23.6 585s 144033 20128 765.43515 51 105 771.00000 760.97040 1.30% 23.6 590s 145357 20350 762.60809 54 169 771.00000 761.01334 1.30% 23.5 595s 147235 20738 766.29741 48 183 771.00000 761.05950 1.29% 23.5 600s 149135 21091 761.35468 48 90 771.00000 761.10870 1.28% 23.4 605s 151158 21500 769.53708 68 43 771.00000 761.16738 1.28% 23.3 610s 152996 21841 cutoff 62 771.00000 761.21686 1.27% 23.3 615s 154879 22208 767.00000 69 40 771.00000 761.27006 1.26% 23.2 620s 156858 22621 768.67503 63 66 771.00000 761.30598 1.26% 23.2 625s 158286 22921 cutoff 72 771.00000 761.32103 1.26% 23.1 630s 160257 23296 769.66248 69 33 771.00000 761.36657 1.25% 23.1 635s 162256 23695 764.13279 62 77 771.00000 761.40181 1.24% 23.0 640s 164127 24060 765.05836 66 53 771.00000 761.45447 1.24% 23.0 645s 165928 24419 761.96307 59 93 771.00000 761.50054 1.23% 22.9 650s 167956 24894 768.46814 63 48 771.00000 761.54904 1.23% 22.9 655s 169927 25245 768.80214 61 41 771.00000 761.60341 1.22% 22.8 660s 171959 25547 765.91165 57 69 771.00000 761.66365 1.21% 22.8 665s 173921 25974 cutoff 61 771.00000 761.70598 1.21% 22.7 670s 175542 26280 765.15223 71 51 771.00000 761.74371 1.20% 22.7 675s 177508 26547 765.73651 64 145 771.00000 761.79044 1.19% 22.6 680s 179498 26944 768.32755 54 93 771.00000 761.82755 1.19% 22.6 685s 181503 27282 767.13220 62 71 771.00000 761.86866 1.18% 22.5 690s 183270 27689 764.23768 63 47 771.00000 761.89828 1.18% 22.5 695s 185270 28005 767.71287 67 57 771.00000 761.94148 1.17% 22.4 700s 187277 28292 763.40684 58 80 771.00000 761.99016 1.17% 22.4 705s 189290 28687 762.38064 53 181 771.00000 762.01664 1.17% 22.3 711s 190781 28902 768.44755 61 91 771.00000 762.03352 1.16% 22.3 715s 192818 29257 762.31622 56 48 771.00000 762.07902 1.16% 22.2 720s 194688 29610 769.48043 64 85 771.00000 762.11015 1.15% 22.2 725s 196808 29949 infeasible 72 771.00000 762.14692 1.15% 22.2 730s 198828 30398 764.30598 59 83 771.00000 762.18276 1.14% 22.1 735s 200959 30755 764.53116 63 40 771.00000 762.22636 1.14% 22.1 740s *201837 29417 72 770.0000000 762.23959 1.01% 22.1 742s 202744 29443 cutoff 73 770.00000 762.26894 1.00% 22.0 745s 204395 29607 763.88801 62 68 770.00000 762.30598 1.00% 22.0 750s 206457 29879 cutoff 67 770.00000 762.32755 1.00% 21.9 755s 208467 30150 763.98806 58 64 770.00000 762.37180 0.99% 21.9 760s 210477 30367 cutoff 61 770.00000 762.41021 0.99% 21.9 765s 212531 30524 cutoff 53 770.00000 762.46757 0.98% 21.9 770s 214370 30788 766.26932 59 97 770.00000 762.50776 0.97% 21.8 775s 216453 31017 762.82781 56 87 770.00000 762.55657 0.97% 21.8 780s 218544 31236 cutoff 61 770.00000 762.60355 0.96% 21.7 785s 220648 31345 765.02235 64 51 770.00000 762.65343 0.95% 21.7 790s 222778 31575 766.72755 68 81 770.00000 762.68051 0.95% 21.6 795s 224799 31797 762.92241 49 170 770.00000 762.72100 0.95% 21.6 800s 226903 31964 cutoff 59 770.00000 762.76797 0.94% 21.6 805s 229017 32217 767.71743 63 59 770.00000 762.80598 0.93% 21.5 810s 230798 32362 765.06316 59 66 770.00000 762.84119 0.93% 21.5 815s 232945 32568 767.88514 53 178 770.00000 762.87537 0.93% 21.5 820s 235028 32707 767.82951 59 61 770.00000 762.90909 0.92% 21.4 825s 237130 32797 cutoff 66 770.00000 762.95382 0.92% 21.4 830s 239195 32911 cutoff 55 770.00000 762.99905 0.91% 21.4 835s 240937 33047 768.75155 67 55 770.00000 763.02605 0.91% 21.4 840s 243118 33212 767.98641 66 57 770.00000 763.06405 0.90% 21.3 845s 245168 33336 cutoff 58 770.00000 763.10598 0.90% 21.3 850s 247464 33612 cutoff 57 770.00000 763.14343 0.89% 21.2 855s 249562 33834 765.57074 72 36 770.00000 763.18051 0.89% 21.2 860s 251222 33903 764.00712 64 30 770.00000 763.21118 0.88% 21.2 865s 252895 34100 767.80598 56 83 770.00000 763.23774 0.88% 21.2 870s 255130 34266 768.08211 55 80 770.00000 763.27595 0.87% 21.1 875s 257210 34384 768.53383 59 87 770.00000 763.30598 0.87% 21.1 880s 259189 34520 767.36681 65 62 770.00000 763.32232 0.87% 21.1 885s 261328 34670 766.97245 55 94 770.00000 763.34946 0.86% 21.1 890s 263035 34842 cutoff 57 770.00000 763.37619 0.86% 21.1 895s 265228 35080 764.24907 62 63 770.00000 763.40891 0.86% 21.0 900s 267248 35229 cutoff 63 770.00000 763.43919 0.85% 21.0 905s 269383 35248 cutoff 72 770.00000 763.48151 0.85% 21.0 910s 271544 35386 764.09260 54 101 770.00000 763.51330 0.84% 21.0 915s 273346 35537 767.60358 61 46 770.00000 763.54293 0.84% 21.0 920s 275481 35619 cutoff 62 770.00000 763.58839 0.83% 20.9 925s 277576 35741 764.07010 61 78 770.00000 763.62410 0.83% 20.9 930s 279682 35897 cutoff 62 770.00000 763.65830 0.82% 20.9 935s 281650 35975 cutoff 63 770.00000 763.67852 0.82% 20.9 940s 283833 36101 cutoff 59 770.00000 763.71117 0.82% 20.9 945s 285998 36142 764.30598 50 90 770.00000 763.75054 0.81% 20.8 950s 288035 36136 764.17577 49 107 770.00000 763.78764 0.81% 20.8 955s 289849 36273 768.01292 59 82 770.00000 763.80598 0.80% 20.8 960s 291948 36369 infeasible 63 770.00000 763.83799 0.80% 20.8 965s 294061 36369 infeasible 65 770.00000 763.87040 0.80% 20.8 970s 295885 36369 766.19480 62 96 770.00000 763.89721 0.79% 20.7 975s 297852 36312 cutoff 73 770.00000 763.92786 0.79% 20.7 980s 299857 36354 cutoff 65 770.00000 763.96098 0.78% 20.7 985s 301809 36258 766.74724 67 57 770.00000 763.99334 0.78% 20.7 990s 304011 36361 cutoff 67 770.00000 764.01439 0.78% 20.7 995s 305773 36459 764.23940 58 75 770.00000 764.03325 0.77% 20.7 1000s 307869 36492 764.91226 58 67 770.00000 764.06575 0.77% 20.7 1005s 309633 36505 765.89394 65 38 770.00000 764.09279 0.77% 20.7 1010s 311666 36583 cutoff 61 770.00000 764.11752 0.76% 20.7 1015s 314001 36715 766.93727 55 147 770.00000 764.14350 0.76% 20.6 1020s 316150 36731 767.64583 67 47 770.00000 764.17416 0.76% 20.6 1025s 317991 36654 cutoff 64 770.00000 764.19905 0.75% 20.6 1030s 320113 36650 cutoff 72 770.00000 764.22782 0.75% 20.6 1035s 322239 36553 cutoff 52 770.00000 764.26590 0.74% 20.6 1040s 324359 36505 767.78155 54 90 770.00000 764.29539 0.74% 20.6 1045s 326169 36540 768.50478 58 82 770.00000 764.30598 0.74% 20.6 1050s 328129 36529 768.30744 63 64 770.00000 764.32476 0.74% 20.5 1055s 330258 36591 cutoff 59 770.00000 764.34072 0.73% 20.5 1060s 332212 36569 765.45488 68 61 770.00000 764.37028 0.73% 20.5 1065s 334044 36580 765.60670 63 43 770.00000 764.38376 0.73% 20.5 1070s 336218 36595 cutoff 67 770.00000 764.41088 0.73% 20.5 1075s 338037 36529 cutoff 60 770.00000 764.43455 0.72% 20.5 1080s 340214 36413 cutoff 67 770.00000 764.47265 0.72% 20.5 1085s 342313 36412 cutoff 71 770.00000 764.50246 0.71% 20.5 1090s 344297 36374 767.07689 79 38 770.00000 764.52957 0.71% 20.5 1095s 346109 36380 765.64398 70 63 770.00000 764.55964 0.71% 20.5 1100s 348353 36372 767.02104 64 60 770.00000 764.59263 0.70% 20.5 1105s 350328 36387 cutoff 60 770.00000 764.61861 0.70% 20.4 1110s 352400 36346 768.08667 68 33 770.00000 764.64754 0.70% 20.4 1115s 354238 36279 infeasible 77 770.00000 764.66817 0.69% 20.4 1120s 356376 36174 cutoff 65 770.00000 764.69313 0.69% 20.4 1125s 358550 36163 cutoff 61 770.00000 764.72265 0.69% 20.4 1130s 360593 36092 767.71151 67 41 770.00000 764.75149 0.68% 20.4 1135s 362789 35885 766.19574 69 33 770.00000 764.79164 0.68% 20.4 1140s 364805 35774 766.78818 64 50 770.00000 764.81889 0.67% 20.4 1145s 366791 35703 infeasible 70 770.00000 764.84682 0.67% 20.4 1150s 368587 35621 cutoff 64 770.00000 764.87447 0.67% 20.4 1155s 370704 35488 765.68653 70 58 770.00000 764.90209 0.66% 20.4 1160s 372788 35259 766.30323 56 91 770.00000 764.93698 0.66% 20.4 1165s 374591 35200 cutoff 56 770.00000 764.95983 0.65% 20.3 1170s 376726 35038 cutoff 64 770.00000 764.99780 0.65% 20.3 1175s 378872 34843 infeasible 59 770.00000 765.01997 0.65% 20.3 1180s 380795 34900 768.98459 63 24 770.00000 765.03794 0.64% 20.3 1185s 382947 34839 cutoff 62 770.00000 765.06539 0.64% 20.3 1190s 384892 34707 infeasible 45 770.00000 765.09161 0.64% 20.3 1195s 386897 34604 765.84186 65 68 770.00000 765.11247 0.63% 20.3 1200s 389127 34428 765.13931 55 90 770.00000 765.13931 0.63% 20.3 1205s 391139 34294 766.35965 59 76 770.00000 765.16727 0.63% 20.3 1210s 393140 34111 infeasible 64 770.00000 765.19880 0.62% 20.3 1215s 395110 33923 cutoff 67 770.00000 765.22458 0.62% 20.3 1220s 397141 33743 765.45522 57 99 770.00000 765.25735 0.62% 20.3 1225s 399377 33642 cutoff 63 770.00000 765.28038 0.61% 20.3 1230s 401348 33475 767.98692 64 38 770.00000 765.30598 0.61% 20.3 1235s 403131 33454 cutoff 64 770.00000 765.30842 0.61% 20.3 1240s 405179 33408 765.42753 60 86 770.00000 765.32755 0.61% 20.3 1245s 407215 33218 infeasible 63 770.00000 765.35312 0.60% 20.3 1250s 409311 33133 768.43138 60 50 770.00000 765.37481 0.60% 20.3 1255s 411234 33007 cutoff 67 770.00000 765.39919 0.60% 20.3 1260s 413327 32790 cutoff 55 770.00000 765.42281 0.59% 20.3 1265s 415282 32511 766.63811 65 70 770.00000 765.45385 0.59% 20.3 1270s 417189 32349 768.27252 54 82 770.00000 765.48233 0.59% 20.2 1275s 419249 32095 767.82951 64 61 770.00000 765.50349 0.58% 20.2 1280s 421314 31861 765.61075 59 68 770.00000 765.53558 0.58% 20.2 1285s 423196 31881 768.34807 71 56 770.00000 765.55188 0.58% 20.2 1290s 425225 31685 766.40328 52 102 770.00000 765.58128 0.57% 20.2 1295s 427318 31419 768.06951 58 148 770.00000 765.61138 0.57% 20.2 1300s 429137 31224 cutoff 61 770.00000 765.63709 0.57% 20.2 1305s 431057 30999 infeasible 67 770.00000 765.66588 0.56% 20.2 1310s 433049 30787 infeasible 61 770.00000 765.68440 0.56% 20.2 1315s 435270 30528 cutoff 65 770.00000 765.71780 0.56% 20.2 1320s 437425 30222 766.56000 65 16 770.00000 765.74510 0.55% 20.2 1325s 439628 29875 765.77595 57 78 770.00000 765.77595 0.55% 20.2 1330s 441530 29603 767.30598 52 83 770.00000 765.80598 0.54% 20.2 1335s 443600 29302 768.10269 63 56 770.00000 765.83026 0.54% 20.2 1340s 445612 28971 768.80598 61 83 770.00000 765.85880 0.54% 20.2 1345s 447565 28653 768.80744 60 67 770.00000 765.88159 0.53% 20.2 1350s 449486 28356 766.50598 59 87 770.00000 765.90598 0.53% 20.2 1355s 451622 27888 cutoff 54 770.00000 765.94190 0.53% 20.2 1360s 453817 27648 infeasible 66 770.00000 765.97248 0.52% 20.2 1365s 455864 27376 cutoff 69 770.00000 766.00000 0.52% 20.2 1370s 457925 27049 cutoff 54 770.00000 766.02820 0.52% 20.2 1375s 459826 26815 cutoff 70 770.00000 766.04830 0.51% 20.2 1380s 461989 26490 767.13051 63 73 770.00000 766.07986 0.51% 20.2 1385s 463885 26109 infeasible 61 770.00000 766.10723 0.51% 20.2 1390s 465662 25835 766.78157 63 68 770.00000 766.12927 0.50% 20.2 1395s 467834 25352 cutoff 67 770.00000 766.16246 0.50% 20.2 1400s 469940 24846 766.68372 68 44 770.00000 766.20079 0.49% 20.2 1405s 472109 24452 768.60358 64 46 770.00000 766.23424 0.49% 20.2 1410s 473898 24064 766.78250 61 71 770.00000 766.26847 0.48% 20.2 1415s 475864 23580 767.17699 57 67 770.00000 766.30204 0.48% 20.2 1420s 477832 23303 767.64020 68 45 770.00000 766.31323 0.48% 20.2 1425s 479561 22975 767.85962 59 58 770.00000 766.33505 0.48% 20.2 1430s 481604 22528 767.36310 51 91 770.00000 766.36289 0.47% 20.2 1435s 483573 22170 766.46633 60 47 770.00000 766.39203 0.47% 20.2 1440s 485292 21738 cutoff 70 770.00000 766.42031 0.46% 20.2 1445s 487242 21226 767.18555 61 73 770.00000 766.44722 0.46% 20.2 1450s 489307 20807 768.07850 68 39 770.00000 766.48292 0.46% 20.2 1455s 491317 20373 768.58805 62 94 770.00000 766.51311 0.45% 20.2 1460s 493226 20019 cutoff 61 770.00000 766.54119 0.45% 20.2 1465s 495238 19527 767.20261 61 58 770.00000 766.58805 0.44% 20.2 1470s 497135 18987 cutoff 62 770.00000 766.63017 0.44% 20.3 1475s 499154 18448 cutoff 52 770.00000 766.67265 0.43% 20.3 1480s 501301 18007 cutoff 74 770.00000 766.71039 0.43% 20.3 1485s 503505 17669 767.48968 71 23 770.00000 766.73713 0.42% 20.2 1490s 505598 17081 cutoff 59 770.00000 766.77841 0.42% 20.2 1495s 507527 16424 768.25373 67 36 770.00000 766.82350 0.41% 20.2 1500s 509474 15775 cutoff 63 770.00000 766.87180 0.41% 20.2 1505s 511606 14945 cutoff 51 770.00000 766.92706 0.40% 20.2 1510s 513541 14464 cutoff 63 770.00000 766.98423 0.39% 20.2 1515s 515725 13855 cutoff 65 770.00000 767.01958 0.39% 20.2 1520s 517843 13196 768.43800 56 53 770.00000 767.07492 0.38% 20.2 1525s 519810 12518 cutoff 65 770.00000 767.12050 0.37% 20.2 1530s 521813 11723 cutoff 53 770.00000 767.18209 0.37% 20.2 1535s 524091 10838 768.86451 54 71 770.00000 767.27661 0.35% 20.2 1540s 525854 10127 768.00000 62 36 770.00000 767.34041 0.35% 20.2 1545s 527899 9239 cutoff 67 770.00000 767.43302 0.33% 20.2 1550s 529932 8302 768.13854 61 61 770.00000 767.54916 0.32% 20.2 1555s 531851 7432 768.50000 72 26 770.00000 767.67382 0.30% 20.2 1560s 534184 6552 768.00000 69 25 770.00000 767.74510 0.29% 20.2 1565s 536416 5258 infeasible 57 770.00000 767.89331 0.27% 20.2 1570s 538772 3904 infeasible 74 770.00000 768.09637 0.25% 20.2 1575s 541136 2156 768.67085 51 78 770.00000 768.45364 0.20% 20.2 1580s Cutting planes: Learned: 3 Gomory: 69 Cover: 150 Implied bound: 182 Clique: 10 MIR: 296 GUB cover: 4 Zero half: 90 Explored 544110 nodes (10956735 simplex iterations) in 1584.56 seconds Thread count was 1 (of 16 available processors) Optimal solution found (tolerance 1.00e-04) Best objective 7.700000000000e+02, best bound 7.700000000000e+02, gap 0.0%