Gurobi 5.0.1 (linux64) logging started Tue Dec 25 13:22:58 2012 Optimize a model with 40802 rows, 40401 columns and 245267 nonzeros Presolve removed 18389 rows and 19609 columns Presolve time: 0.64s Presolved: 22413 rows, 20792 columns, 112141 nonzeros Variable types: 199 continuous, 20593 integer (20593 binary) Root relaxation: objective 9.068091e+02, 2074 iterations, 0.25 seconds Nodes | Current Node | Objective Bounds | Work Expl Unexpl | Obj Depth IntInf | Incumbent BestBd Gap | It/Node Time 0 0 906.80907 0 350 - 906.80907 - - 1s 0 0 938.46161 0 336 - 938.46161 - - 2s 0 0 943.78476 0 382 - 943.78476 - - 2s 0 0 946.01414 0 345 - 946.01414 - - 3s 0 0 946.40695 0 346 - 946.40695 - - 3s 0 0 946.55541 0 357 - 946.55541 - - 3s 0 0 946.75117 0 293 - 946.75117 - - 4s 0 0 946.94302 0 320 - 946.94302 - - 5s 0 0 946.94302 0 329 - 946.94302 - - 5s 0 0 947.09302 0 282 - 947.09302 - - 6s 0 0 947.23636 0 309 - 947.23636 - - 6s 0 0 947.23636 0 318 - 947.23636 - - 6s 0 0 947.23636 0 260 - 947.23636 - - 7s 0 0 947.23636 0 293 - 947.23636 - - 8s 0 0 947.23636 0 307 - 947.23636 - - 8s 0 0 968.47863 0 299 - 968.47863 - - 10s 0 0 968.47863 0 299 - 968.47863 - - 11s 0 2 968.47863 0 280 - 968.47863 - - 13s 36 38 997.21110 25 289 - 969.54405 - 39.0 15s 219 156 980.18290 18 315 - 970.09961 - 46.6 20s 400 327 1067.88941 99 288 - 970.09961 - 41.2 25s 601 449 1008.59270 46 299 - 970.54405 - 38.3 34s 603 450 984.19084 21 373 - 970.54405 - 38.2 57s 604 451 994.59992 36 289 - 970.54405 - 38.2 74s 605 452 1080.94998 117 359 - 973.25674 - 38.1 105s 606 452 994.59992 36 234 - 976.46359 - 38.0 124s 607 453 1052.48163 70 331 - 977.86672 - 38.0 147s 608 454 984.19084 21 297 - 978.59963 - 37.9 164s 609 454 980.61235 11 344 - 980.61235 - 37.8 181s 610 455 1018.25261 53 257 - 981.16698 - 37.8 196s 611 456 1085.95050 122 278 - 982.38831 - 37.7 212s 612 456 1008.59270 46 316 - 982.95468 - 37.7 230s 613 457 1062.37147 98 331 - 983.28327 - 37.6 247s 614 458 1062.54324 95 328 - 983.48692 - 37.5 279s 615 458 1080.94998 117 355 - 984.21955 - 37.5 298s 616 459 1009.71784 42 331 - 984.86715 - 37.4 319s 617 460 1062.54324 95 418 - 985.38676 - 37.4 375s 618 460 1062.37147 98 419 - 986.48305 - 37.3 405s 619 461 1009.71784 42 330 - 987.31153 - 37.2 424s 620 462 1069.58382 104 372 - 987.41472 - 37.2 448s 621 462 1003.07009 33 358 - 987.73194 - 37.1 480s 622 463 1062.71857 91 341 - 987.79186 - 37.0 502s 623 464 1018.25261 53 341 - 987.89795 - 37.0 528s 624 464 1083.84509 122 374 - 987.99813 - 36.9 542s 625 465 1056.90301 85 423 - 988.08975 - 36.9 575s 626 466 1062.37147 98 370 - 988.12810 - 36.8 603s 627 466 1085.95050 122 357 - 988.18250 - 36.8 628s 628 467 1069.58382 104 382 - 988.25889 - 36.7 657s 629 468 1073.52700 113 356 - 988.29095 - 36.6 685s 630 468 1018.25261 53 348 - 988.35131 - 36.6 711s 631 469 1083.84509 122 376 - 988.40055 - 36.5 745s 632 470 1056.90301 85 373 - 988.43062 - 36.5 769s 633 470 1085.95050 122 366 - 988.57064 - 36.4 789s 634 471 988.62908 11 447 - 988.62908 - 36.3 846s 635 472 1069.58382 104 450 - 988.65275 - 36.3 885s 636 472 1080.94998 117 373 - 988.83368 - 36.2 918s 637 473 1085.95050 122 390 - 988.83492 - 36.2 949s 638 474 1062.71857 91 384 - 988.83672 - 36.1 990s 639 474 1008.59270 46 380 - 988.83672 - 36.1 1026s 640 475 1085.95050 122 388 - 988.83672 - 36.0 1056s 641 476 1069.58382 104 386 - 988.83672 - 36.0 1072s 644 479 1009.71784 42 299 - 988.86073 - 86.0 1091s 646 480 988.86073 11 367 - 988.86073 - 85.7 1115s 647 481 1056.90301 85 308 - 988.86073 - 85.6 1153s 648 482 1009.71784 42 299 - 988.89699 - 85.5 1170s 649 482 1062.71857 91 243 - 989.24714 - 85.3 1196s 650 483 1069.58382 104 255 - 989.25796 - 85.2 1217s 651 484 1062.37147 98 332 - 989.28219 - 85.1 1245s 652 484 1062.54324 95 356 - 989.54089 - 84.9 1284s 653 485 1021.43401 58 411 - 989.55522 - 84.8 1310s 654 486 989.60824 11 360 - 989.60824 - 84.7 1343s 655 486 1062.37147 98 356 - 989.82073 - 84.5 1375s 656 487 1073.52700 113 343 - 989.92013 - 84.4 1399s 657 488 1062.71857 91 372 - 990.22131 - 84.3 1413s 658 488 1008.59270 46 366 - 990.27598 - 84.2 1445s 659 489 1009.71784 42 331 - 990.44498 - 84.0 1468s 660 490 990.46655 11 343 - 990.46655 - 83.9 1490s 661 490 1056.90301 85 352 - 990.46721 - 83.8 1526s 662 491 1062.37147 98 348 - 990.46721 - 83.7 1557s 663 492 1083.84509 122 347 - 990.46721 - 83.5 1595s 664 492 1069.58382 104 374 - 990.46721 - 83.4 1614s 665 493 1080.94998 117 374 - 990.46721 - 83.3 1624s 666 494 990.46721 11 374 - 990.46721 - 83.2 1632s 667 496 990.57739 26 365 - 990.57739 - 109 1635s 669 498 993.06788 27 311 - 990.60635 - 109 1640s 763 559 1007.00792 74 131 - 990.60635 - 99.0 1645s 884 628 1064.84519 134 152 - 990.60635 - 90.4 1650s 1014 666 994.28997 31 346 - 991.89592 - 84.1 1655s 1167 752 1001.46452 34 371 - 991.89592 - 77.9 1660s 1367 854 1025.95039 87 163 - 992.40287 - 70.1 1665s 1511 941 1046.99471 148 196 - 992.40287 - 65.9 1670s 1665 1013 994.32063 38 220 - 992.82112 - 61.9 1675s 1893 1162 1005.60171 82 198 - 992.82112 - 57.9 1680s 2114 1240 1007.30772 67 166 - 993.09466 - 55.6 1685s 2291 1406 1050.10367 170 176 - 993.09466 - 54.1 1690s 2546 1607 infeasible 234 - 993.09466 - 50.6 1695s 2789 1802 1007.69835 45 233 - 993.20577 - 48.3 1700s 2991 1961 1019.02957 81 162 - 993.20577 - 47.6 1705s 3237 2195 1056.59537 218 191 - 993.20577 - 46.0 1710s 3458 2381 997.87336 41 196 - 993.20577 - 44.3 1715s 3712 2598 1032.37434 69 165 - 993.37029 - 43.1 1720s 3911 2741 999.05420 51 233 - 993.55651 - 42.7 1725s 4154 2931 1032.89734 81 235 - 993.65006 - 42.1 1730s 4389 3117 1014.10604 68 154 - 993.75108 - 41.6 1735s 4671 3397 1078.75117 207 183 - 993.75108 - 40.6 1740s 4940 3588 998.65396 38 222 - 993.84914 - 39.4 1745s 5149 3780 1010.95511 62 199 - 993.84914 - 39.1 1750s 5333 3881 1026.15574 75 330 - 994.03287 - 39.2 1755s 5491 3983 infeasible 49 - 994.11081 - 39.8 1760s 5646 4067 994.20577 35 220 - 994.20577 - 40.3 1765s 5828 4189 1023.19452 72 187 - 994.21817 - 40.5 1770s 6019 4308 infeasible 43 - 994.26821 - 40.4 1775s 6134 4363 infeasible 53 - 994.28997 - 41.1 1780s 6276 4421 1019.87015 45 317 - 994.29534 - 41.6 1785s 6433 4483 1018.95123 50 231 - 994.30500 - 42.1 1790s 6622 4552 1004.09350 45 221 - 994.30500 - 42.3 1795s 6827 4655 1010.59090 59 145 - 994.32063 - 42.2 1800s 7008 4801 1045.54631 152 102 - 994.32063 - 41.5 1805s 7178 4873 1002.15393 46 201 - 994.33122 - 41.6 1810s 7392 5015 1040.37765 97 183 - 994.33169 - 41.5 1815s 7613 5185 1016.41247 83 124 - 994.33169 - 41.0 1820s 7815 5335 1004.39237 40 214 - 994.33169 - 40.4 1825s 8041 5533 1025.35443 108 124 - 994.33626 - 40.0 1830s 8285 5719 1022.79671 75 198 - 994.36295 - 39.6 1835s 8488 5894 1020.21633 47 228 - 994.36295 - 39.3 1840s 8705 6036 1015.26568 70 169 - 994.36726 - 39.2 1845s 8901 6168 1010.99524 38 218 - 994.36726 - 39.0 1850s 9092 6308 1001.80224 41 240 - 994.39653 - 38.8 1855s 9312 6490 1012.02789 86 176 - 994.39851 - 38.6 1860s 9473 6539 994.40890 37 248 - 994.40890 - 38.8 1865s 9645 6667 1027.81701 112 156 - 994.43384 - 38.8 1870s 9793 6735 infeasible 49 - 994.55113 - 39.1 1875s 9970 6863 1024.93248 99 171 - 994.60431 - 39.1 1880s 10155 7018 infeasible 44 - 994.61576 - 38.9 1885s 10201 7032 1009.42166 47 220 - 994.61827 - 38.9 1891s 10333 7119 1028.51365 65 196 - 994.65707 - 39.0 1895s 10562 7298 infeasible 48 - 994.68071 - 38.8 1900s 10757 7409 1016.79448 59 226 - 994.68571 - 38.9 1905s 10961 7584 1086.51939 199 149 - 994.68571 - 38.5 1910s 11129 7694 1003.60913 52 190 - 994.69994 - 38.5 1915s 11342 7866 1023.43087 52 344 - 994.70577 - 38.3 1920s 11490 7923 1009.64951 49 219 - 994.71164 - 38.6 1925s 11633 7974 1006.54347 44 329 - 994.73950 - 39.0 1930s 11754 8010 1003.87110 42 259 - 994.76821 - 39.3 1935s 11876 8055 1042.07781 65 271 - 994.77760 - 39.7 1940s 11964 8103 1002.71445 51 178 - 994.80693 - 39.9 1945s 12116 8169 infeasible 48 - 994.81315 - 40.1 1950s 12275 8309 1100.74172 127 222 - 994.81315 - 40.1 1955s 12468 8398 999.17092 46 268 - 994.81405 - 40.2 1960s 12679 8572 infeasible 40 - 994.81456 - 40.1 1965s 12901 8721 1030.45348 114 191 - 994.85205 - 40.0 1970s 13109 8861 1004.21022 43 218 - 994.86138 - 39.8 1975s 13386 9082 999.80347 38 219 - 994.87243 - 39.5 1980s 13636 9257 1046.28652 80 223 - 994.87680 - 39.3 1985s 13835 9376 1068.68969 88 232 - 994.90369 - 39.3 1990s 14006 9520 1014.98702 59 202 - 994.91355 - 39.2 1995s 14229 9680 1020.94122 51 263 - 994.91524 - 39.2 2000s 14375 9747 1053.69434 64 189 - 994.93713 - 39.2 2005s 14575 9867 1018.56724 44 259 - 994.95721 - 39.3 2010s 14735 9951 infeasible 37 - 994.97633 - 39.4 2015s 14904 10102 1080.43526 120 134 - 994.98846 - 39.4 2020s 15074 10250 1026.40356 74 217 - 994.99079 - 39.2 2025s 15254 10393 1017.52068 63 214 - 995.00897 - 39.2 2030s 15447 10478 999.17432 42 231 - 995.03910 - 39.3 2035s 15646 10611 1007.40428 55 212 - 995.04355 - 39.3 2040s 15852 10753 1000.29585 44 231 - 995.05055 - 39.0 2045s 16001 10818 1003.50138 39 323 - 995.06587 - 39.2 2050s 16180 10970 1060.98294 153 224 - 995.06587 - 39.0 2055s 16400 11130 1066.37755 95 221 - 995.07036 - 38.9 2060s 16628 11262 1010.42168 54 187 - 995.08767 - 38.8 2065s 16769 11337 infeasible 47 - 995.11081 - 39.1 2070s 16878 11384 1015.03707 51 310 - 995.11081 - 39.3 2075s 17074 11574 1057.76987 100 261 - 995.11081 - 39.3 2080s 17245 11702 1096.80044 172 244 - 995.11081 - 39.2 2085s 17325 11743 1147.54673 208 231 - 995.11081 - 39.3 2090s 17471 11818 1004.42816 41 341 - 995.11881 - 39.4 2095s 17614 11883 infeasible 47 - 995.12127 - 39.7 2100s 17792 11966 1031.19549 77 190 - 995.12764 - 39.8 2105s 17827 11981 infeasible 41 - 995.14055 - 40.2 2110s 17949 12076 infeasible 68 - 995.16200 - 40.5 2116s 17995 12092 infeasible 51 - 995.16749 - 40.8 2121s 18065 12137 1025.23815 65 205 - 995.17234 - 40.9 2125s 18246 12242 infeasible 43 - 995.20577 - 41.0 2130s 18359 12321 1010.97076 63 209 - 995.20577 - 41.2 2135s 18527 12459 1045.95017 117 121 - 995.20577 - 41.3 2140s 18764 12642 997.97207 39 219 - 995.20577 - 41.0 2145s 18855 12683 infeasible 39 - 995.21382 - 41.3 2150s 18931 12702 997.46301 41 328 - 995.22139 - 41.7 2155s 19039 12756 1003.02638 44 219 - 995.22202 - 41.8 2160s 19169 12790 1006.28056 53 204 - 995.23702 - 42.0 2165s 19292 12879 1022.88319 54 229 - 995.23713 - 42.2 2170s 19416 12925 1005.00456 41 234 - 995.24109 - 42.4 2175s 19579 13051 1088.48740 117 199 - 995.24109 - 42.5 2180s 19696 13108 infeasible 41 - 995.24943 - 42.7 2185s 19789 13137 infeasible 55 - 995.24994 - 43.0 2190s 19928 13200 infeasible 49 - 995.26821 - 43.2 2195s 19929 13199 infeasible 50 - 995.26821 - 43.8 2203s 19936 13197 998.36041 35 316 - 995.27878 - 43.9 2205s 19960 13201 995.29763 39 219 - 995.27878 - 44.0 2210s 20089 13288 1004.89305 44 261 - 995.29148 - 44.1 2215s 20296 13421 infeasible 42 - 995.29481 - 44.0 2220s 20402 13488 1061.32924 83 213 - 995.31346 - 44.2 2229s 20423 13495 1000.59029 43 242 - 995.31857 - 44.1 2230s 20575 13617 1050.59169 109 102 - 995.31857 - 44.2 2235s 20694 13694 infeasible 51 - 995.32063 - 45.0 2247s 20744 13716 infeasible 47 - 995.32776 - 45.1 2250s 20919 13824 1003.89433 47 215 - 995.32882 - 45.1 2255s 21045 13912 infeasible 43 - 995.33446 - 45.1 2260s 21212 14069 1063.92267 138 119 - 995.33446 - 45.1 2265s 21354 14119 1009.48424 46 262 - 995.34813 - 45.1 2270s 21558 14276 infeasible 144 - 995.35118 - 45.0 2275s 21672 14328 1000.02549 45 233 - 995.35273 - 45.2 2280s 21808 14394 1003.44453 37 334 - 995.36081 - 45.3 2285s 21934 14438 1009.59987 44 234 - 995.38303 - 45.5 2290s 22061 14511 infeasible 45 - 995.40363 - 45.5 2295s 22232 14646 infeasible 92 - 995.40577 - 45.6 2301s 22234 14646 infeasible 92 - 995.40577 - 46.2 2308s 22260 14654 1058.00811 96 169 - 995.40577 - 46.2 2310s 22330 14667 infeasible 56 - 995.41877 - 46.8 2320s 22363 14677 997.92933 42 241 - 995.42880 - 47.0 2325s 22485 14755 infeasible 40 - 995.44281 - 47.1 2330s 22605 14809 infeasible 46 - 995.48101 - 48.3 2349s 22618 14812 infeasible 41 - 995.48704 - 48.3 2350s 22621 14813 infeasible 44 - 995.48704 - 48.8 2356s 22698 14868 1022.52862 71 183 - 995.48990 - 48.8 2360s 22770 14906 996.03311 38 219 - 995.49994 - 48.9 2365s 22893 14966 1020.04202 64 289 - 995.50865 - 49.1 2370s 23043 15074 1016.22741 72 294 - 995.51836 - 49.1 2375s 23295 15281 1002.86424 48 330 - 995.52274 - 48.8 2380s 23358 15299 995.93930 33 348 - 995.52689 - 48.9 2385s 23471 15360 1015.61333 64 229 - 995.54715 - 49.1 2390s 23648 15482 1000.44415 36 364 - 995.56646 - 49.0 2395s 23825 15603 1050.10579 88 174 - 995.56674 - 49.0 2400s 23999 15745 1061.04136 136 128 - 995.56943 - 48.9 2405s 24121 15864 1080.38286 204 132 - 995.56943 - 48.7 2410s 24278 15923 1001.94694 43 346 - 995.59302 - 48.8 2415s 24324 15955 1027.92881 53 253 - 995.60232 - 49.1 2420s 24470 16003 1003.53586 51 207 - 995.61475 - 49.2 2425s 24614 16084 1011.55412 47 266 - 995.62243 - 49.2 2430s 24623 16091 infeasible 54 - 995.62243 - 49.8 2439s 24634 16087 infeasible 39 - 995.63236 - 49.8 2440s 24749 16168 1068.34127 94 178 - 995.64293 - 49.8 2445s 24903 16303 1037.43321 127 101 - 995.65082 - 49.7 2450s 24944 16337 infeasible 147 - 995.65082 - 50.0 2455s 25041 16399 1002.70435 38 374 - 995.66545 - 50.1 2460s 25172 16477 1006.66445 50 215 - 995.67107 - 50.1 2465s 25302 16526 995.91066 38 198 - 995.70770 - 50.2 2470s 25451 16600 infeasible 46 - 995.73832 - 50.3 2475s 25623 16759 infeasible 103 - 995.73832 - 50.2 2480s 25819 16840 1009.18855 55 235 - 995.75543 - 50.2 2485s 25894 16877 1002.00123 42 215 - 995.75684 - 50.3 2490s 26035 16956 1038.01603 72 288 - 995.76830 - 50.3 2495s 26161 17014 997.70971 46 202 - 995.80097 - 50.5 2500s 26260 17044 infeasible 59 - 995.80966 - 50.6 2505s 26449 17186 1094.07678 147 222 - 995.81841 - 50.4 2510s 26653 17326 1045.15056 167 149 - 995.82485 - 50.3 2515s 26847 17482 1120.81034 318 140 - 995.82485 - 50.0 2520s 26924 17524 infeasible 48 - 995.82715 - 50.2 2525s 27064 17628 1018.11817 90 166 - 995.82715 - 50.2 2530s 27251 17754 1002.87193 51 230 - 995.84491 - 50.1 2535s 27373 17793 997.79453 37 337 - 995.85055 - 50.3 2540s 27528 17936 infeasible 115 - 995.85055 - 50.3 2545s 27698 18025 999.12383 43 214 - 995.85691 - 50.3 2550s 27793 18060 infeasible 39 - 995.87289 - 50.5 2555s 27861 18070 infeasible 41 - 995.89456 - 50.6 2560s 28013 18197 1045.11178 108 138 - 995.91066 - 50.6 2565s 28206 18386 1101.86433 218 124 - 995.91066 - 50.4 2570s 28347 18445 1000.98889 42 213 - 995.96528 - 50.4 2575s 28463 18507 1038.57830 81 225 - 995.98673 - 50.5 2580s 28688 18663 infeasible 41 - 995.99462 - 50.3 2585s 28792 18693 996.88412 38 330 - 996.02236 - 50.5 2590s 28913 18765 996.95216 50 216 - 996.03594 - 50.5 2595s 29043 18855 infeasible 51 - 996.03932 - 50.6 2600s 29103 18879 infeasible 44 - 996.05603 - 50.9 2606s 29197 18921 1013.50193 50 193 - 996.07344 - 50.9 2610s 29403 19084 1001.73418 46 241 - 996.08077 - 50.8 2615s 29502 19137 1007.73137 44 314 - 996.11081 - 51.0 2620s 29547 19162 infeasible 41 - 996.11081 - 51.2 2625s 29639 19206 infeasible 54 - 996.11501 - 51.4 2630s 29742 19240 infeasible 45 - 996.12933 - 51.5 2635s 29828 19272 999.08298 42 351 - 996.13410 - 51.7 2640s 29912 19308 1000.50302 37 315 - 996.13410 - 51.8 2645s 30075 19402 1006.46228 38 363 - 996.15044 - 51.8 2650s 30217 19499 1001.96642 41 336 - 996.15528 - 51.9 2655s 30327 19571 infeasible 53 - 996.15945 - 51.9 2660s 30490 19704 1050.09767 113 206 - 996.16827 - 51.9 2665s 30603 19799 infeasible 171 - 996.16827 - 51.8 2672s 30656 19821 infeasible 46 - 996.20028 - 52.1 2678s 30665 19820 infeasible 47 - 996.20028 - 52.1 2680s 30885 19990 1019.56569 74 210 - 996.22843 - 52.0 2685s 31039 20093 1002.30505 40 158 - 996.22843 - 51.9 2690s 31232 20203 1014.71887 55 131 - 996.23107 - 51.9 2695s 31386 20312 infeasible 48 - 996.23434 - 52.0 2701s 31449 20318 infeasible 40 - 996.23702 - 52.1 2705s 31610 20402 1024.06290 86 200 - 996.24148 - 52.1 2710s 31727 20487 1004.83870 45 226 - 996.24148 - 52.2 2715s 31914 20656 1063.61026 143 245 - 996.24162 - 52.2 2720s 32017 20706 1002.60540 48 214 - 996.25172 - 52.2 2725s 32224 20877 1033.51663 91 206 - 996.25328 - 52.1 2730s 32431 21025 1006.89327 53 191 - 996.25328 - 52.1 2735s 32693 21226 1032.62991 81 180 - 996.25591 - 51.9 2740s 32901 21394 1024.79363 69 237 - 996.26294 - 51.7 2745s 33052 21509 infeasible 77 - 996.26294 - 51.8 2750s 33218 21613 1005.43434 35 263 - 996.28796 - 51.7 2755s 33383 21722 infeasible 81 - 996.29263 - 51.9 2765s 33484 21806 1029.66895 87 167 - 996.29420 - 51.9 2770s 33634 21916 infeasible 42 - 996.29792 - 52.0 2775s 33736 21980 infeasible 49 - 996.30295 - 52.0 2780s 33869 22016 infeasible 50 - 996.31712 - 52.1 2785s 34005 22112 infeasible 94 - 996.31712 - 52.1 2790s 34157 22225 1040.54285 86 228 - 996.35125 - 52.1 2795s 34281 22282 infeasible 49 - 996.37407 - 52.1 2800s 34408 22323 infeasible 54 - 996.39470 - 52.2 2805s 34474 22345 1011.26629 55 232 - 996.39470 - 52.4 2810s 34580 22376 infeasible 42 - 996.40657 - 52.5 2815s 34611 22387 infeasible 43 - 996.40915 - 52.7 2820s 34726 22476 infeasible 44 - 996.41511 - 52.9 2829s 34748 22478 999.41092 47 220 - 996.41799 - 52.9 2830s 34851 22518 infeasible 53 - 996.43453 - 53.0 2835s 34924 22536 infeasible 48 - 996.45577 - 53.2 2840s 35099 22659 1003.40140 40 177 - 996.46022 - 53.1 2845s 35283 22823 1073.08592 102 244 - 996.46022 - 53.1 2850s 35349 22867 1014.01225 60 217 - 996.46980 - 53.2 2855s 35506 22960 997.93475 42 173 - 996.47882 - 53.2 2860s 35621 23046 1020.12549 70 208 - 996.48673 - 53.3 2865s 35844 23220 infeasible 45 - 996.49465 - 53.1 2870s 36013 23364 1005.78078 52 227 - 996.49764 - 53.0 2875s 36138 23461 1003.83093 51 203 - 996.49785 - 53.0 2880s 36217 23484 1010.07039 37 373 - 996.50172 - 53.2 2885s 36242 23503 infeasible 46 - 996.50172 - 53.6 2894s 36250 23501 infeasible 47 - 996.50172 - 53.6 2895s 36375 23546 1019.11491 49 265 - 996.50506 - 53.7 2900s 36432 23568 infeasible 57 - 996.50931 - 53.8 2905s 36634 23722 infeasible 95 - 996.51950 - 53.8 2910s 36834 23877 infeasible 115 - 996.53073 - 53.7 2915s 36996 23939 997.55368 52 259 - 996.54005 - 53.7 2920s 37167 24054 infeasible 46 - 996.54842 - 53.7 2925s 37270 24093 infeasible 50 - 996.55781 - 53.9 2931s 37327 24110 1031.51590 60 288 - 996.56123 - 53.9 2935s 37479 24210 1013.88849 47 357 - 996.56787 - 54.0 2940s 37670 24379 1041.23929 143 122 - 996.56865 - 53.9 2945s 37838 24492 1003.36053 47 249 - 996.57083 - 53.9 2950s 37856 24502 infeasible 53 - 996.57083 - 54.1 2955s 37909 24532 infeasible 53 - 996.57344 - 54.6 2971s 37967 24557 1021.43600 61 200 - 996.57407 - 54.6 2975s 38061 24629 1014.19813 67 199 - 996.57407 - 54.7 2980s 38158 24676 infeasible 52 - 996.57506 - 54.8 2985s 38292 24734 infeasible 48 - 996.58279 - 54.9 2991s 38351 24749 infeasible 53 - 996.59347 - 55.0 2995s 38440 24806 infeasible 47 - 996.59429 - 55.7 3015s 38524 24874 1029.36193 84 129 - 996.60010 - 55.7 3020s 38714 25017 infeasible 44 - 996.60113 - 55.6 3025s 38801 25042 infeasible 44 - 996.61604 - 55.7 3031s 38880 25095 998.45571 44 322 - 996.61827 - 55.8 3035s 38971 25159 1016.52053 54 256 - 996.61982 - 55.8 3040s 39086 25218 infeasible 43 - 996.63084 - 55.9 3045s 39195 25256 1000.25172 39 151 - 996.65202 - 56.0 3050s 39363 25373 1005.52768 51 237 - 996.65202 - 55.9 3055s 39516 25511 1049.00646 121 90 - 996.65220 - 55.9 3060s 39615 25554 997.92471 43 224 - 996.67082 - 55.9 3065s 39773 25661 998.94755 42 142 - 996.69462 - 55.9 3070s 39964 25824 1009.22543 53 228 - 996.69703 - 55.8 3075s 40158 25964 1017.94146 79 206 - 996.70301 - 55.7 3080s 40370 26145 infeasible 190 - 996.70301 - 55.5 3085s 40491 26189 infeasible 49 - 996.70789 - 55.7 3091s 40565 26220 infeasible 55 - 996.71066 - 55.7 3095s 40610 26223 infeasible 44 - 996.71689 - 55.9 3100s 40683 26262 infeasible 56 - 996.71761 - 55.9 3105s 40804 26346 1061.70343 91 194 - 996.72429 - 56.0 3412s 40904 26418 infeasible 40 - 996.72429 - 55.9 3415s 41000 26451 infeasible 46 - 996.73698 - 56.0 3421s 41074 26502 1023.38417 71 249 - 996.74360 - 56.1 3425s 41215 26600 infeasible 51 - 996.74757 - 56.1 3430s 41380 26759 1062.26321 131 146 - 996.75170 - 56.0 3435s 41540 26867 infeasible 56 - 996.76208 - 56.0 3440s 41670 26924 998.21022 39 224 - 996.76334 - 56.0 3445s 41872 27080 1019.73933 75 237 - 996.76758 - 56.0 3450s 42048 27213 infeasible 126 - 996.76758 - 55.9 3455s 42234 27339 1014.01065 51 197 - 996.76758 - 55.9 3460s 42432 27493 infeasible 53 - 996.78073 - 55.8 3465s 42506 27514 1001.51158 52 171 - 996.78469 - 55.9 3470s 42683 27618 1043.78010 63 173 - 996.79437 - 55.9 3475s 42795 27680 1000.26808 45 149 - 996.80211 - 56.0 3480s 42871 27702 1005.30966 42 234 - 996.81299 - 56.1 3485s 43068 27881 1062.81289 155 110 - 996.81299 - 56.0 3490s 43270 28024 1022.25959 79 216 - 996.81712 - 55.9 3495s 43423 28129 infeasible 49 - 996.82006 - 55.9 3500s 43603 28236 999.20577 41 229 - 996.82198 - 55.9 3505s 43705 28258 infeasible 41 - 996.82510 - 56.0 3510s 43814 28319 1009.36647 60 214 - 996.83950 - 56.0 3515s 43983 28449 infeasible 57 - 996.84100 - 56.0 3520s 44089 28514 infeasible 52 - 996.85193 - 56.1 3525s 44164 28553 infeasible 54 - 996.86100 - 56.2 3530s 44309 28612 infeasible 44 - 996.87471 - 56.2 3535s 44474 28706 997.71792 41 339 - 996.88106 - 56.2 3540s 44503 28717 infeasible 56 - 996.88106 - 56.5 3547s 44512 28720 1002.06640 44 211 - 996.88253 - 56.6 3550s 44679 28818 1005.38999 51 218 - 996.90369 - 56.5 3555s 44925 29021 1004.00789 51 230 - 996.91838 - 56.4 3560s 45187 29252 1044.91445 116 287 - 996.92918 - 56.2 3565s 45263 29298 infeasible 54 - 996.92937 - 56.3 3570s 45460 29448 1007.68497 41 231 - 996.93304 - 56.3 3575s 45580 29506 1001.30616 60 162 - 996.94084 - 56.3 3580s 45774 29636 1000.41023 56 161 - 996.94084 - 56.3 3585s 45955 29758 1005.27324 46 364 - 996.94808 - 56.3 3590s 46091 29851 1043.19178 89 156 - 996.97799 - 56.3 3595s Cutting planes: Learned: 43 Gomory: 61 Cover: 178 Implied bound: 5 Clique: 18 MIR: 1226 GUB cover: 68 Zero half: 223 Explored 46325 nodes (2612329 simplex iterations) in 3600.00 seconds Thread count was 1 (of 16 available processors) Time limit reached Best objective -, best bound 9.970000000000e+02, gap -