Gurobi 5.0.1 (linux64) logging started Wed Dec 26 10:43:10 2012 Optimize a model with 3402 rows, 3280 columns and 14080 nonzeros Presolve removed 667 rows and 80 columns Presolve time: 0.10s Presolved: 2735 rows, 3200 columns, 13221 nonzeros Variable types: 1560 continuous, 1640 integer (1640 binary) Root relaxation: objective 2.317214e+02, 3984 iterations, 0.20 seconds Nodes | Current Node | Objective Bounds | Work Expl Unexpl | Obj Depth IntInf | Incumbent BestBd Gap | It/Node Time 0 0 231.72145 0 81 - 231.72145 - - 0s 0 0 259.30972 0 93 - 259.30972 - - 0s 0 0 289.56004 0 73 - 289.56004 - - 0s 0 0 291.40653 0 84 - 291.40653 - - 0s 0 0 292.32578 0 90 - 292.32578 - - 0s 0 0 292.80008 0 84 - 292.80008 - - 0s 0 0 294.43930 0 90 - 294.43930 - - 0s 0 0 297.42049 0 84 - 297.42049 - - 0s 0 0 297.62725 0 88 - 297.62725 - - 0s 0 0 297.62725 0 88 - 297.62725 - - 1s 0 2 297.64975 0 88 - 297.64975 - - 2s 173 163 329.26610 107 66 - 299.57248 - 63.0 5s 605 554 305.50748 11 81 - 299.88573 - 50.9 10s 620 566 314.16075 11 91 - 301.01645 - 61.0 15s 814 677 329.21159 36 56 - 302.07976 - 84.2 20s 974 775 389.19480 116 48 - 302.07976 - 108 25s 1191 882 352.69657 52 37 - 302.44627 - 123 30s 1628 1042 335.38910 33 70 - 302.85245 - 117 35s 2188 1325 313.20187 24 85 - 304.21581 - 105 40s 2762 1829 345.21291 170 52 - 306.01424 - 97.2 45s 3336 2299 340.98125 112 81 - 306.80527 - 93.6 50s 3883 2763 407.43615 76 47 - 306.92032 - 92.0 55s 4497 3294 infeasible 259 - 307.16526 - 89.0 60s 5093 3802 433.31072 183 53 - 307.46709 - 86.4 65s 5645 4251 344.86095 45 62 - 307.58652 - 85.3 70s 6044 4549 343.12650 40 35 - 307.85473 - 87.3 75s 6464 4885 337.81658 37 55 - 308.04583 - 88.2 80s 6981 5302 329.81059 26 62 - 308.33223 - 88.1 85s 7399 5618 322.41299 22 77 - 308.53543 - 89.7 90s 7807 5910 362.24644 41 59 - 308.68041 - 91.6 95s 8280 6295 332.17875 27 63 - 308.85827 - 92.4 100s 8650 6576 336.67848 36 67 - 309.08864 - 93.7 105s 9020 6857 349.29760 32 74 - 309.29610 - 94.7 110s 9418 7151 320.77953 20 71 - 309.39686 - 95.3 115s 9832 7471 318.59757 24 79 - 309.64601 - 96.0 120s 10149 7725 347.01338 38 66 - 309.82841 - 97.8 125s 10488 8008 410.75463 76 53 - 309.92591 - 99.1 130s 10865 8300 325.57780 26 63 - 310.25211 - 100 135s 11251 8606 329.37945 29 78 - 310.45703 - 101 140s 11635 8912 328.80180 33 67 - 310.65205 - 102 145s 11894 9129 362.77036 51 66 - 310.80903 - 104 150s 12245 9400 365.20804 49 66 - 310.91876 - 104 155s 12580 9657 370.10798 49 57 - 310.99359 - 105 160s 12924 9921 357.79182 36 67 - 311.15038 - 106 165s 13318 10236 379.50431 39 77 - 311.33532 - 106 170s 13728 10560 317.11553 86 73 - 311.53565 - 106 175s 14102 10851 363.61417 59 46 - 311.58331 - 107 180s 14543 11215 354.38314 39 66 - 311.64672 - 107 185s 14907 11495 431.73580 96 58 - 311.77922 - 107 190s 15301 11787 372.14572 88 79 - 311.92085 - 108 195s 15713 12095 infeasible 53 - 312.00874 - 108 200s 16213 12477 332.82405 30 79 - 312.17866 - 107 205s 16593 12797 408.38961 65 88 - 312.29396 - 108 210s 16927 13038 391.90055 55 76 - 312.37316 - 108 215s 17340 13367 346.24657 34 76 - 312.48018 - 108 220s 17679 13633 444.44244 68 49 - 312.51634 - 109 225s 18077 13940 366.59782 51 70 - 312.58317 - 109 230s 18415 14199 444.67561 74 62 - 312.64342 - 109 235s 18751 14420 394.23571 43 59 - 312.72343 - 110 240s 19218 14783 354.70844 55 73 - 312.77147 - 110 245s 19575 15068 350.80701 101 82 - 312.82331 - 110 250s 20003 15412 363.17035 35 70 - 312.96851 - 110 255s 20412 15737 343.94248 53 50 - 313.00099 - 110 260s 20778 16013 397.34590 61 30 - 313.10711 - 110 265s 21153 16303 323.22692 27 76 - 313.13199 - 111 270s H21340 14575 405.0000000 313.15495 22.7% 111 272s H21476 14465 402.0000000 313.17299 22.1% 111 274s 21503 14492 343.47052 53 54 402.00000 313.17299 22.1% 111 275s H21530 14380 400.0000000 313.17804 21.7% 111 275s H21557 14186 397.0000000 313.17804 21.1% 111 276s H21584 14144 396.0000000 313.17990 20.9% 110 277s H21665 13799 391.0000000 313.19043 19.9% 110 278s H21746 12310 376.0000000 313.20207 16.7% 110 279s 21771 12333 370.95908 70 64 376.00000 313.20207 16.7% 110 280s 21911 12430 373.42041 80 77 376.00000 313.24227 16.7% 110 285s 21925 12441 313.24227 26 80 376.00000 313.24227 16.7% 110 290s 21971 12472 337.81497 49 68 376.00000 313.24227 16.7% 110 295s 22066 12515 327.13038 62 87 376.00000 313.24227 16.7% 111 300s 22231 12552 361.18151 59 69 376.00000 313.24227 16.7% 111 305s 22579 12692 347.22613 71 80 376.00000 313.24227 16.7% 110 310s 22991 12851 315.87541 32 71 376.00000 313.24227 16.7% 110 315s 23483 13047 314.34756 34 86 376.00000 313.24227 16.7% 109 320s 24043 13282 336.09370 66 75 376.00000 313.24227 16.7% 109 325s 24760 13537 322.92499 44 84 376.00000 313.24227 16.7% 108 330s 25404 13756 342.43980 50 70 376.00000 313.57054 16.6% 107 335s 26160 14053 330.94960 63 77 376.00000 314.00595 16.5% 106 340s 26813 14295 342.58642 59 63 376.00000 314.63945 16.3% 106 345s 27578 14558 323.02720 47 82 376.00000 315.29075 16.1% 105 350s 28462 14905 323.87485 45 81 376.00000 315.87558 16.0% 104 355s 29225 15188 321.13769 48 79 376.00000 316.43892 15.8% 103 360s 30106 15542 334.34150 48 74 376.00000 316.91458 15.7% 102 365s 30875 15854 344.97594 67 78 376.00000 317.25712 15.6% 102 370s H31128 14995 367.0000000 317.34840 13.5% 101 371s 31682 15209 337.87236 47 57 367.00000 317.69361 13.4% 101 375s 32567 15522 355.66400 92 59 367.00000 318.16939 13.3% 100 380s 33421 15784 340.99536 57 69 367.00000 318.42055 13.2% 100 385s 34262 16094 341.04978 45 70 367.00000 318.59465 13.2% 99.3 390s 35116 16421 347.30559 48 43 367.00000 318.86225 13.1% 98.7 395s 35933 16684 360.57896 48 54 367.00000 319.01563 13.1% 98.3 400s 36832 16975 327.55316 48 71 367.00000 319.26653 13.0% 97.9 405s 37772 17286 333.66798 41 70 367.00000 319.51681 12.9% 97.3 410s 38665 17570 330.83711 54 63 367.00000 319.82694 12.9% 96.7 415s 39567 17871 342.84126 42 76 367.00000 320.08007 12.8% 96.2 420s 40434 18171 327.28008 47 67 367.00000 320.23996 12.7% 95.8 425s 41323 18470 343.76979 44 44 367.00000 320.46528 12.7% 95.5 430s 42274 18725 351.36825 71 43 367.00000 320.67619 12.6% 95.1 435s 43220 19047 326.33097 31 81 367.00000 320.83530 12.6% 94.6 440s 43904 19301 352.48944 52 66 367.00000 320.99279 12.5% 94.3 445s 44749 19622 infeasible 86 367.00000 321.12340 12.5% 93.9 450s 45728 19953 364.06991 95 71 367.00000 321.24158 12.5% 93.5 455s 46653 20231 334.91420 64 57 367.00000 321.40299 12.4% 93.2 460s 47703 20558 348.63978 75 76 367.00000 321.54106 12.4% 92.7 465s 48575 20815 344.87538 68 77 367.00000 321.66088 12.4% 92.6 470s 49636 21199 325.87446 48 65 367.00000 321.84905 12.3% 92.0 475s 50671 21556 342.45398 69 56 367.00000 321.97300 12.3% 91.5 480s 51655 21914 340.38753 52 84 367.00000 322.13638 12.2% 91.1 485s 52609 22238 330.44699 54 70 367.00000 322.27883 12.2% 90.8 490s 53556 22553 325.48052 41 67 367.00000 322.43913 12.1% 90.5 495s H54136 21732 364.0000000 322.52140 11.4% 90.3 498s H54163 19716 359.0000000 322.53702 10.2% 90.3 498s 54244 19784 355.14756 68 33 359.00000 322.54024 10.2% 90.2 500s H54271 18392 356.0000000 322.56720 9.39% 90.2 500s H54298 17287 354.0000000 322.56936 8.88% 90.3 501s 54942 17676 337.65105 40 68 354.00000 322.69178 8.84% 90.0 505s 55840 18187 327.62716 41 92 354.00000 322.80707 8.81% 89.8 510s 56923 18815 infeasible 67 354.00000 322.94521 8.77% 89.4 515s 57870 19249 336.24735 48 55 354.00000 323.09317 8.73% 89.2 520s 58823 19769 349.86455 41 65 354.00000 323.26244 8.68% 89.0 525s 59824 20302 339.34135 62 63 354.00000 323.40097 8.64% 88.8 530s 60806 20790 339.42309 56 83 354.00000 323.57414 8.59% 88.6 535s 61207 20988 328.91648 49 88 354.00000 323.61786 8.58% 88.5 609s 61212 20991 337.08171 48 98 354.00000 323.61786 8.58% 88.5 610s 61222 20998 331.63359 61 107 354.00000 323.61786 8.58% 88.4 615s 61234 21008 323.61786 35 98 354.00000 323.61786 8.58% 88.5 620s 61325 21032 323.61786 43 65 354.00000 323.61786 8.58% 88.6 625s 61696 21143 338.62513 66 59 354.00000 323.61786 8.58% 88.7 630s 62196 21302 334.92408 51 69 354.00000 323.61786 8.58% 88.8 635s 62983 21532 333.72789 45 79 354.00000 323.61786 8.58% 88.6 640s 63775 21729 347.10637 76 47 354.00000 323.61786 8.58% 88.5 645s 64809 22048 329.50264 45 68 354.00000 323.61786 8.58% 88.1 650s 65813 22252 cutoff 58 354.00000 324.21661 8.41% 87.9 655s 66667 22472 331.86090 45 66 354.00000 324.89481 8.22% 87.6 660s 67734 22685 344.65261 72 40 354.00000 325.59883 8.02% 87.3 665s 68842 22912 352.39859 48 67 354.00000 326.33581 7.81% 86.9 670s 70001 23138 341.66972 58 66 354.00000 326.94486 7.64% 86.6 675s 71241 23390 330.11086 51 67 354.00000 327.38231 7.52% 86.1 680s 72523 23676 345.74280 66 40 354.00000 327.82280 7.39% 85.7 685s 73878 23910 340.69816 55 51 354.00000 328.27355 7.27% 85.2 690s 75141 24081 352.24205 49 47 354.00000 328.71399 7.14% 84.8 695s 76135 24152 335.65238 51 55 354.00000 329.02616 7.05% 84.6 700s 77362 24252 342.97413 52 63 354.00000 329.38231 6.95% 84.3 705s 78560 24371 333.17385 43 74 354.00000 329.76848 6.85% 84.0 710s 79924 24535 347.00805 67 63 354.00000 330.08961 6.75% 83.6 715s 80935 24589 346.70787 57 52 354.00000 330.33891 6.68% 83.4 720s 82088 24665 343.76522 50 69 354.00000 330.63881 6.60% 83.2 725s 83276 24724 341.60771 49 70 354.00000 330.94624 6.51% 82.9 730s 84746 24872 cutoff 61 354.00000 331.22426 6.43% 82.5 735s 85939 24959 334.79847 43 69 354.00000 331.44539 6.37% 82.1 740s 87297 25033 335.76425 49 29 354.00000 331.72347 6.29% 81.8 745s 88609 25081 334.64048 52 58 354.00000 331.95822 6.23% 81.5 750s 89832 25090 352.20956 63 46 354.00000 332.17736 6.16% 81.3 755s 91149 25112 cutoff 65 354.00000 332.41024 6.10% 81.0 760s 92541 25234 333.87959 61 68 354.00000 332.60490 6.04% 80.7 765s 93831 25297 338.68125 57 65 354.00000 332.78827 5.99% 80.4 770s 95394 25436 infeasible 61 354.00000 332.98423 5.94% 79.9 775s 96703 25455 350.73158 76 43 354.00000 333.18186 5.88% 79.6 780s 98099 25498 343.38896 54 52 354.00000 333.35734 5.83% 79.3 785s 99526 25493 338.14146 47 70 354.00000 333.53624 5.78% 79.0 790s 100914 25512 340.72778 53 55 354.00000 333.71698 5.73% 78.7 795s 102238 25524 336.73879 44 81 354.00000 333.90421 5.68% 78.4 800s 103634 25516 345.84606 71 32 354.00000 334.07069 5.63% 78.1 805s 105038 25500 342.01155 45 73 354.00000 334.24362 5.58% 77.8 810s 106636 25578 343.51614 51 66 354.00000 334.35155 5.55% 77.5 815s 108058 25516 343.33193 58 53 354.00000 334.51956 5.50% 77.2 820s 109332 25464 349.75681 67 55 354.00000 334.65300 5.47% 77.0 825s 110697 25395 351.04843 56 69 354.00000 334.79726 5.42% 76.7 830s 112104 25377 342.75835 56 61 354.00000 334.95223 5.38% 76.5 835s 113562 25378 345.35694 78 54 354.00000 335.05618 5.35% 76.2 840s 115005 25414 346.86666 46 64 354.00000 335.19774 5.31% 75.9 845s 116532 25346 cutoff 57 354.00000 335.33215 5.27% 75.6 850s 117940 25336 cutoff 43 354.00000 335.46805 5.24% 75.4 855s 119553 25326 349.23169 52 62 354.00000 335.59946 5.20% 75.0 860s 121070 25263 344.92509 46 69 354.00000 335.73549 5.16% 74.7 865s 122759 25161 343.39574 66 32 354.00000 335.87982 5.12% 74.3 870s 124448 25156 cutoff 46 354.00000 336.00300 5.08% 74.0 875s 125875 25592 338.24448 46 71 354.00000 336.11343 5.05% 73.7 880s 127552 26067 339.80272 49 61 354.00000 336.25308 5.01% 73.4 885s 129067 26503 cutoff 61 354.00000 336.37091 4.98% 73.1 890s 130579 26913 cutoff 56 354.00000 336.48938 4.95% 72.9 895s 132043 27319 cutoff 63 354.00000 336.58311 4.92% 72.6 900s 133499 27696 341.19498 52 58 354.00000 336.69607 4.89% 72.4 905s 135276 28247 339.61454 45 56 354.00000 336.80246 4.86% 72.0 910s 136715 28591 352.07712 56 51 354.00000 336.89159 4.83% 71.8 915s 138253 28961 339.21965 47 71 354.00000 336.98646 4.81% 71.6 920s 139729 29313 349.49092 61 44 354.00000 337.10496 4.77% 71.4 925s 141395 29752 cutoff 56 354.00000 337.23557 4.74% 71.1 930s 142899 30094 339.15612 49 68 354.00000 337.33330 4.71% 70.9 935s 144418 30480 342.49202 63 63 354.00000 337.43794 4.68% 70.7 940s 146003 30827 345.53268 51 57 354.00000 337.55729 4.64% 70.5 945s 147634 31213 344.71408 49 67 354.00000 337.67502 4.61% 70.2 950s 149216 31555 351.13381 54 46 354.00000 337.76041 4.59% 70.0 955s 150830 31949 339.45380 57 55 354.00000 337.85825 4.56% 69.8 960s 152492 32330 infeasible 57 354.00000 337.96007 4.53% 69.5 965s 154158 32670 345.31690 58 68 354.00000 338.05591 4.50% 69.3 970s 155878 33034 346.89724 54 43 354.00000 338.15444 4.48% 69.1 975s 157373 33342 348.53910 48 69 354.00000 338.22821 4.46% 68.9 980s 159034 33763 cutoff 47 354.00000 338.33217 4.43% 68.7 985s 160530 34081 infeasible 48 354.00000 338.41338 4.40% 68.5 990s 162144 34436 347.69816 53 52 354.00000 338.50979 4.38% 68.3 995s 163707 34699 347.38592 65 41 354.00000 338.61134 4.35% 68.1 1000s 165334 35070 347.65546 69 32 354.00000 338.68740 4.33% 68.0 1005s 166947 35395 347.27153 55 76 354.00000 338.78295 4.30% 67.8 1010s 168613 35725 344.37974 65 38 354.00000 338.86451 4.28% 67.6 1015s 170124 35991 351.90758 64 53 354.00000 338.95953 4.25% 67.4 1020s 171925 36344 cutoff 55 354.00000 339.04588 4.22% 67.2 1025s 173750 36723 346.19540 61 60 354.00000 339.12204 4.20% 66.9 1030s 175357 37008 352.12950 56 66 354.00000 339.20414 4.18% 66.7 1035s 177035 37238 348.91978 50 50 354.00000 339.29213 4.15% 66.6 1040s 178602 37487 352.27665 55 64 354.00000 339.36282 4.13% 66.4 1045s 180249 37844 350.09184 55 68 354.00000 339.43923 4.11% 66.2 1050s 182021 38115 349.58636 62 40 354.00000 339.52921 4.09% 66.0 1055s 183547 38244 345.33899 64 66 354.00000 339.61795 4.06% 65.9 1060s 185173 38497 343.95527 56 31 354.00000 339.70333 4.04% 65.7 1065s 187030 38840 cutoff 54 354.00000 339.79050 4.01% 65.5 1070s 188615 39069 345.00000 58 26 354.00000 339.87224 3.99% 65.3 1075s 190271 39297 350.35943 65 46 354.00000 339.94894 3.97% 65.2 1080s 191962 39543 349.14727 72 62 354.00000 340.02920 3.95% 65.0 1085s 193617 39774 348.77905 70 58 354.00000 340.11396 3.92% 64.9 1090s 195169 39981 351.04077 48 55 354.00000 340.18740 3.90% 64.7 1095s 196820 40179 346.40784 63 41 354.00000 340.26999 3.88% 64.6 1100s 198573 40458 343.41211 47 65 354.00000 340.33574 3.86% 64.4 1105s 200232 40588 351.42908 57 56 354.00000 340.40396 3.84% 64.3 1110s 201954 40823 348.30371 49 44 354.00000 340.47954 3.82% 64.1 1115s 203692 41087 351.50239 55 61 354.00000 340.55500 3.80% 64.0 1120s 205468 41315 cutoff 51 354.00000 340.62908 3.78% 63.8 1125s 207199 41517 344.58932 55 57 354.00000 340.69968 3.76% 63.6 1130s 208918 41659 343.03324 53 74 354.00000 340.78197 3.73% 63.4 1135s 210658 41772 350.32244 65 47 354.00000 340.86675 3.71% 63.3 1140s 212204 41933 343.47790 58 77 354.00000 340.93102 3.69% 63.2 1145s 213990 42117 cutoff 73 354.00000 341.00320 3.67% 63.0 1150s 215644 42251 346.59986 60 43 354.00000 341.07958 3.65% 62.9 1155s 217466 42409 347.32273 52 50 354.00000 341.15475 3.63% 62.7 1160s 219188 42503 352.02052 50 56 354.00000 341.21706 3.61% 62.6 1165s 220868 42573 348.73470 62 45 354.00000 341.28898 3.59% 62.4 1170s 222590 42667 352.97051 59 61 354.00000 341.36920 3.57% 62.3 1175s 224202 42837 infeasible 62 354.00000 341.43186 3.55% 62.2 1180s 226103 43070 cutoff 70 354.00000 341.49869 3.53% 62.0 1185s 227707 43141 351.98194 56 70 354.00000 341.56891 3.51% 61.9 1190s 229549 43231 349.12904 64 44 354.00000 341.64171 3.49% 61.8 1195s 231211 43349 infeasible 59 354.00000 341.70805 3.47% 61.6 1200s 233026 43401 342.75477 48 52 354.00000 341.78102 3.45% 61.5 1205s 234677 43406 350.24596 53 60 354.00000 341.85759 3.43% 61.4 1210s 236192 43421 348.94363 57 69 354.00000 341.92538 3.41% 61.3 1215s 238008 43445 cutoff 58 354.00000 342.00244 3.39% 61.2 1220s 239699 43472 345.31235 56 45 354.00000 342.08245 3.37% 61.1 1225s 241400 43463 350.92172 69 74 354.00000 342.15332 3.35% 61.0 1230s 242985 43490 cutoff 78 354.00000 342.22799 3.33% 60.9 1235s 244694 43461 347.32660 48 66 354.00000 342.30495 3.30% 60.8 1240s 246525 43519 347.36160 73 62 354.00000 342.37923 3.28% 60.6 1245s 248150 43530 351.51026 56 62 354.00000 342.44748 3.26% 60.5 1250s 249974 43572 343.58924 51 65 354.00000 342.51711 3.24% 60.4 1255s 251501 43453 cutoff 52 354.00000 342.59640 3.22% 60.4 1260s 253087 43426 346.17310 52 69 354.00000 342.66614 3.20% 60.3 1265s 254816 43402 cutoff 52 354.00000 342.74392 3.18% 60.2 1270s 256385 43394 344.84822 56 55 354.00000 342.80776 3.16% 60.1 1275s 258201 43360 349.87627 50 59 354.00000 342.87697 3.14% 60.0 1280s 259801 43282 351.67219 49 68 354.00000 342.94685 3.12% 59.9 1285s 261429 43195 cutoff 53 354.00000 343.01397 3.10% 59.8 1290s 262955 43066 350.44576 56 74 354.00000 343.07781 3.09% 59.7 1295s 264764 42965 346.89345 65 49 354.00000 343.14463 3.07% 59.6 1300s 266506 42839 349.91181 50 59 354.00000 343.21910 3.05% 59.5 1305s 268323 42734 cutoff 57 354.00000 343.29232 3.02% 59.4 1310s 270000 42665 cutoff 61 354.00000 343.35980 3.01% 59.3 1315s 271587 42486 cutoff 61 354.00000 343.43326 2.98% 59.2 1320s 273402 42399 347.70246 53 65 354.00000 343.51170 2.96% 59.1 1325s 275119 42260 350.15848 58 55 354.00000 343.58212 2.94% 59.0 1330s 276814 42134 cutoff 47 354.00000 343.64870 2.92% 58.9 1335s 278586 41968 351.24785 58 47 354.00000 343.72661 2.90% 58.8 1340s 280457 41808 352.50433 64 45 354.00000 343.79522 2.88% 58.7 1345s 282131 41636 cutoff 69 354.00000 343.86131 2.86% 58.6 1350s 283774 41393 352.10998 58 48 354.00000 343.93667 2.84% 58.6 1355s 285295 41241 346.69066 65 42 354.00000 343.99985 2.82% 58.5 1360s 287033 40928 cutoff 54 354.00000 344.08369 2.80% 58.4 1365s 288687 40720 344.31077 56 54 354.00000 344.15910 2.78% 58.3 1370s 290438 40430 347.20212 55 63 354.00000 344.23905 2.76% 58.2 1375s 292116 40194 350.21974 58 38 354.00000 344.31543 2.74% 58.2 1380s 293809 39856 cutoff 64 354.00000 344.39731 2.71% 58.1 1385s 295435 39606 347.10191 60 46 354.00000 344.47228 2.69% 58.0 1390s 297160 39261 345.93097 65 34 354.00000 344.55930 2.67% 57.9 1395s 298916 38979 349.43357 61 59 354.00000 344.64384 2.64% 57.9 1400s 300559 38655 348.38884 58 56 354.00000 344.72958 2.62% 57.8 1405s 302275 38307 348.23476 59 65 354.00000 344.80593 2.60% 57.7 1410s 304040 37951 348.43601 55 62 354.00000 344.88729 2.57% 57.6 1415s 305643 37571 351.64829 55 46 354.00000 344.97353 2.55% 57.6 1420s 307341 37238 cutoff 59 354.00000 345.04805 2.53% 57.5 1425s 309039 36888 352.99318 61 57 354.00000 345.12677 2.51% 57.4 1430s 310662 36436 cutoff 65 354.00000 345.20961 2.48% 57.4 1435s 312383 36019 cutoff 57 354.00000 345.29401 2.46% 57.3 1440s 314115 35559 cutoff 70 354.00000 345.37399 2.44% 57.2 1445s 315803 35046 351.99535 58 28 354.00000 345.46664 2.41% 57.2 1450s 317558 34567 cutoff 60 354.00000 345.55886 2.38% 57.1 1455s 319369 34015 351.44658 86 37 354.00000 345.66540 2.35% 57.0 1460s 321071 33479 351.32317 58 69 354.00000 345.75927 2.33% 56.9 1465s 322796 32829 cutoff 63 354.00000 345.86739 2.30% 56.8 1470s 324584 32187 350.84998 67 76 354.00000 345.97848 2.27% 56.8 1475s 326270 31536 347.49184 56 60 354.00000 346.08177 2.24% 56.7 1480s 328028 30826 infeasible 56 354.00000 346.19701 2.20% 56.6 1485s 329684 30153 cutoff 55 354.00000 346.29846 2.18% 56.6 1490s 331503 29454 351.48160 60 54 354.00000 346.40935 2.14% 56.5 1495s 333288 28755 cutoff 50 354.00000 346.51515 2.11% 56.4 1500s 335083 28000 cutoff 49 354.00000 346.63035 2.08% 56.4 1505s 336916 27181 cutoff 66 354.00000 346.75552 2.05% 56.3 1510s 338715 26210 349.38182 70 72 354.00000 346.89914 2.01% 56.2 1515s 340462 25315 349.98938 57 58 354.00000 347.02394 1.97% 56.1 1520s 342302 24310 cutoff 66 354.00000 347.16392 1.93% 56.1 1525s 344155 23330 352.41879 72 54 354.00000 347.30061 1.89% 56.0 1530s 346101 22261 cutoff 69 354.00000 347.45604 1.85% 55.9 1535s 348169 21063 cutoff 57 354.00000 347.63507 1.80% 55.8 1540s 350067 19852 351.91448 65 68 354.00000 347.80830 1.75% 55.7 1545s 352048 18644 cutoff 51 354.00000 347.99343 1.70% 55.6 1550s 354034 17277 cutoff 56 354.00000 348.19683 1.64% 55.5 1555s 356168 15817 cutoff 64 354.00000 348.42476 1.57% 55.4 1560s 358190 14336 352.50662 62 49 354.00000 348.65066 1.51% 55.3 1565s 360569 12501 cutoff 67 354.00000 348.92751 1.43% 55.1 1570s 363068 10459 infeasible 49 354.00000 349.26792 1.34% 55.0 1575s 365817 8096 cutoff 56 354.00000 349.70881 1.21% 54.8 1580s 368912 5291 cutoff 61 354.00000 350.34092 1.03% 54.5 1585s 373241 1052 cutoff 64 354.00000 352.07834 0.54% 54.0 1590s Cutting planes: Gomory: 6 Implied bound: 6 MIR: 2 Flow cover: 42 GUB cover: 1 Zero half: 1 Explored 374295 nodes (20179344 simplex iterations) in 1590.67 seconds Thread count was 1 (of 16 available processors) Optimal solution found (tolerance 1.00e-04) Best objective 3.540000000000e+02, best bound 3.540000000000e+02, gap 0.0%