Combinatorial Optimization: Polyhedra and Efficiency, Band 1Springer Science & Business Media, 12.02.2003 - 1881 Seiten This book offers an in-depth overview of polyhedral methods and efficient algorithms in combinatorial optimization.These methods form a broad, coherent and powerful kernel in combinatorial optimization, with strong links to discrete mathematics, mathematical programming and computer science. In eight parts, various areas are treated, each starting with an elementary introduction to the area, with short, elegant proofs of the principal results, and each evolving to the more advanced methods and results, with full proofs of some of the deepest theorems in the area. Over 4000 references to further research are given, and historical surveys on the basic subjects are presented. |
Inhalt
I | 1 |
II | 2 |
III | 4 |
IV | 5 |
V | 6 |
VI | 8 |
VII | 9 |
IX | 11 |
CDLVI | 737 |
CDLVII | 738 |
CDLVIII | 741 |
CDLIX | 743 |
CDLXI | 745 |
CDLXIII | 746 |
CDLXIV | 747 |
CDLXVI | 751 |
XII | 14 |
XIV | 16 |
XVI | 28 |
XVII | 36 |
XVIII | 37 |
XIX | 38 |
XX | 39 |
XXII | 40 |
XXIV | 42 |
XXVI | 43 |
XXVII | 44 |
XXIX | 46 |
XXX | 47 |
XXXI | 48 |
XXXII | 49 |
XXXIII | 59 |
XXXIV | 60 |
XXXVI | 61 |
XXXVIII | 63 |
XXXIX | 65 |
XLI | 67 |
XLIII | 68 |
XLIV | 71 |
XLV | 72 |
XLVI | 73 |
XLVII | 74 |
XLVIII | 75 |
XLIX | 76 |
L | 81 |
LI | 82 |
LII | 83 |
LIV | 84 |
LV | 85 |
LVI | 87 |
LVIII | 88 |
LIX | 89 |
LX | 91 |
LXII | 93 |
LXIV | 94 |
LXVI | 96 |
LXVII | 97 |
LXVIII | 98 |
LXIX | 99 |
LXX | 101 |
LXXI | 103 |
LXXII | 105 |
LXXIII | 107 |
LXXVI | 109 |
LXXVII | 110 |
LXXVIII | 111 |
LXXIX | 112 |
LXXX | 114 |
LXXXI | 115 |
LXXXII | 116 |
LXXXIII | 117 |
LXXXIV | 118 |
LXXXV | 119 |
LXXXVI | 131 |
LXXXVII | 133 |
LXXXVIII | 134 |
LXXXIX | 135 |
XC | 136 |
XCI | 137 |
XCII | 138 |
XCIII | 140 |
XCV | 141 |
XCVI | 142 |
XCVII | 148 |
XCIX | 150 |
C | 151 |
CII | 152 |
CIII | 153 |
CIV | 154 |
CV | 155 |
CVI | 156 |
CVII | 159 |
CVIII | 160 |
CIX | 162 |
CXI | 164 |
CXII | 170 |
CXIV | 171 |
CXV | 172 |
CXVI | 173 |
CXVII | 174 |
CXVIII | 175 |
CXIX | 176 |
CXX | 177 |
CXXII | 178 |
CXXIII | 179 |
CXXIV | 182 |
CXXV | 183 |
CXXVI | 186 |
CXXVII | 190 |
CXXVIII | 191 |
CXXIX | 192 |
CXXX | 195 |
CXXXI | 198 |
CXXXII | 202 |
CXXXIII | 203 |
CXXXIV | 204 |
CXXXV | 205 |
CXXXVI | 207 |
CXXXVIII | 210 |
CXXXIX | 213 |
CXL | 214 |
CXLI | 217 |
CXLII | 218 |
CXLIII | 219 |
CXLIV | 220 |
CXLV | 221 |
CXLVI | 222 |
CXLVII | 224 |
CXLVIII | 226 |
CXLIX | 227 |
CL | 229 |
CLI | 230 |
CLII | 232 |
CLIII | 233 |
CLIV | 235 |
CLV | 236 |
CLVI | 237 |
CLVII | 239 |
CLVIII | 241 |
CLIX | 242 |
CLX | 243 |
CLXI | 246 |
CLXII | 247 |
CLXIII | 248 |
CLXIV | 251 |
CLXV | 252 |
CLXVI | 253 |
CLXVII | 257 |
CLXVIII | 259 |
CLXIX | 260 |
CLXX | 262 |
CLXXII | 263 |
CLXXIV | 264 |
CLXXV | 265 |
CLXXVII | 267 |
CLXXVIII | 275 |
CLXXIX | 276 |
CLXXXI | 277 |
CLXXXIII | 278 |
CLXXXIV | 285 |
CLXXXV | 286 |
CLXXXVI | 288 |
CLXXXVII | 289 |
CLXXXVIII | 290 |
CLXXXIX | 292 |
CXC | 301 |
CXCIII | 303 |
CXCIV | 304 |
CXCV | 305 |
CXCVII | 307 |
CXCVIII | 308 |
CXCIX | 309 |
CC | 310 |
CCI | 311 |
CCII | 314 |
CCIII | 315 |
CCIV | 317 |
CCVI | 318 |
CCVIII | 319 |
CCIX | 321 |
CCX | 322 |
CCXII | 323 |
CCXIII | 324 |
CCXIV | 325 |
CCXV | 326 |
CCXVI | 327 |
CCXVII | 328 |
CCXVIII | 329 |
CCXIX | 330 |
CCXX | 331 |
CCXXI | 333 |
CCXXII | 334 |
CCXXIII | 335 |
CCXXIV | 336 |
CCXXV | 337 |
CCXXVI | 338 |
CCXXVII | 339 |
CCXXVIII | 341 |
CCXXIX | 342 |
CCXXX | 343 |
CCXXXI | 345 |
CCXXXII | 346 |
CCXXXIII | 347 |
CCXXXIV | 348 |
CCXXXV | 349 |
CCXXXVI | 350 |
CCXXXVII | 351 |
CCXXXVIII | 353 |
CCXXXIX | 355 |
CCXL | 359 |
CCXLII | 361 |
CCXLIII | 362 |
CCXLIV | 378 |
CCXLV | 379 |
CCXLVI | 380 |
CCXLVII | 382 |
CCXLIX | 383 |
CCL | 385 |
CCLI | 387 |
CCLII | 389 |
CCLIV | 390 |
CCLV | 393 |
CCLVI | 395 |
CCLVII | 397 |
CCLVIII | 399 |
CCLIX | 401 |
CCLX | 402 |
CCLXI | 407 |
CCLXII | 408 |
CCLXIII | 409 |
CCLXIV | 411 |
CCLXV | 413 |
CCLXVI | 415 |
CCLXIX | 418 |
CCLXX | 421 |
CCLXXI | 422 |
CCLXXII | 423 |
CCLXXIII | 425 |
CCLXXV | 426 |
CCLXXVI | 427 |
CCLXXVII | 428 |
CCLXXVIII | 429 |
CCLXXIX | 430 |
CCLXXX | 431 |
CCLXXXI | 438 |
CCLXXXIII | 439 |
CCLXXXIV | 440 |
CCLXXXV | 442 |
CCLXXXVI | 443 |
CCLXXXVII | 444 |
CCLXXXVIII | 446 |
CCLXXXIX | 448 |
CCXC | 450 |
CCXCI | 452 |
CCXCII | 453 |
CCXCIII | 454 |
CCXCIV | 456 |
CCXCV | 458 |
CCXCVI | 459 |
CCXCVIII | 461 |
CCC | 462 |
CCCI | 464 |
CCCII | 465 |
CCCIII | 467 |
CCCIV | 468 |
CCCV | 470 |
CCCVI | 474 |
CCCVII | 475 |
CCCVIII | 477 |
CCCIX | 478 |
CCCX | 480 |
CCCXI | 482 |
CCCXII | 485 |
CCCXIII | 487 |
CCCXV | 488 |
CCCXVI | 490 |
CCCXVII | 491 |
CCCXVIII | 493 |
CCCXIX | 494 |
CCCXX | 498 |
CCCXXI | 499 |
CCCXXII | 500 |
CCCXXIII | 501 |
CCCXXIV | 507 |
CCCXXV | 510 |
CCCXXVI | 515 |
CCCXXVII | 517 |
CCCXXVIII | 519 |
CCCXXIX | 520 |
CCCXXX | 521 |
CCCXXXI | 522 |
CCCXXXIII | 523 |
CCCXXXIV | 524 |
CCCXXXV | 526 |
CCCXXXVI | 528 |
CCCXXXVII | 531 |
CCCXXXIX | 532 |
CCCXL | 533 |
CCCXLII | 534 |
CCCXLIII | 535 |
CCCXLIV | 536 |
CCCXLV | 539 |
CCCXLVI | 544 |
CCCXLVIII | 545 |
CCCXLIX | 546 |
CCCL | 547 |
CCCLI | 550 |
CCCLII | 554 |
CCCLIII | 556 |
CCCLIV | 558 |
CCCLV | 559 |
CCCLVI | 560 |
CCCLVII | 561 |
CCCLVIII | 562 |
CCCLIX | 564 |
CCCLX | 566 |
CCCLXI | 567 |
CCCLXIII | 569 |
CCCLXIV | 570 |
CCCLXVI | 571 |
CCCLXVII | 572 |
CCCLXVIII | 573 |
CCCLXIX | 574 |
CCCLXX | 575 |
CCCLXXI | 576 |
CCCLXXIII | 577 |
CCCLXXIV | 578 |
CCCLXXVI | 579 |
CCCLXXVII | 581 |
CCCLXXVIII | 582 |
CCCLXXIX | 583 |
CCCLXXX | 584 |
CCCLXXXI | 586 |
CCCLXXXII | 589 |
CCCLXXXIII | 591 |
CCCLXXXIV | 593 |
CCCLXXXV | 594 |
CCCLXXXVI | 597 |
CCCLXXXVII | 598 |
CCCLXXXVIII | 600 |
CCCLXXXIX | 604 |
CCCXC | 605 |
CCCXCII | 607 |
CCCXCIII | 608 |
CCCXCIV | 609 |
CCCXCV | 611 |
CCCXCVI | 612 |
CCCXCVII | 613 |
CCCXCVIII | 614 |
CD | 617 |
CDI | 619 |
CDII | 620 |
CDIII | 621 |
CDIV | 622 |
CDV | 624 |
CDVI | 630 |
CDVII | 643 |
CDVIII | 644 |
CDIX | 646 |
CDX | 647 |
CDXI | 649 |
CDXII | 651 |
CDXIV | 652 |
CDXV | 653 |
CDXVI | 654 |
CDXVII | 659 |
CDXVIII | 662 |
CDXX | 663 |
CDXXI | 664 |
CDXXII | 666 |
CDXXIV | 667 |
CDXXV | 668 |
CDXXVI | 669 |
CDXXVII | 671 |
CDXXIX | 672 |
CDXXX | 688 |
CDXXXI | 690 |
CDXXXII | 693 |
CDXXXIII | 698 |
CDXXXIV | 699 |
CDXXXV | 700 |
CDXXXVI | 702 |
CDXXXVII | 704 |
CDXXXVIII | 705 |
CDXXXIX | 707 |
CDXL | 710 |
CDXLI | 712 |
CDXLII | 717 |
CDXLIII | 719 |
CDXLIV | 720 |
CDXLV | 721 |
CDXLVI | 722 |
CDXLVII | 723 |
CDXLVIII | 725 |
CDXLIX | 727 |
CDL | 729 |
CDLI | 730 |
CDLII | 731 |
CDLIII | 732 |
CDLIV | 734 |
CDLV | 736 |
CDLXVII | 753 |
CDLXVIII | 756 |
CDLXIX | 757 |
CDLXX | 762 |
CDLXXI | 763 |
CDLXXII | 764 |
CDLXXIII | 766 |
CDLXXV | 768 |
CDLXXVI | 771 |
CDLXXVII | 773 |
CDLXXIX | 774 |
CDLXXX | 775 |
CDLXXXI | 776 |
CDLXXXIII | 779 |
CDLXXXIV | 781 |
CDLXXXV | 782 |
CDLXXXVII | 783 |
CDLXXXVIII | 784 |
CDLXXXIX | 786 |
CDXCI | 787 |
CDXCIII | 789 |
CDXCIV | 790 |
CDXCV | 792 |
CDXCVI | 793 |
CDXCVII | 795 |
CDXCIX | 796 |
D | 797 |
DI | 798 |
DII | 799 |
DIII | 800 |
DIV | 801 |
DV | 804 |
DVI | 805 |
DVII | 807 |
DVIII | 809 |
DIX | 811 |
DX | 818 |
DXII | 819 |
DXIII | 820 |
DXIV | 821 |
DXV | 823 |
DXVI | 825 |
DXVII | 826 |
DXVIII | 828 |
DXIX | 829 |
DXX | 832 |
DXXI | 833 |
DXXII | 834 |
DXXIII | 835 |
DXXIV | 837 |
DXXV | 838 |
DXXVI | 840 |
DXXVII | 841 |
DXXVIII | 842 |
DXXIX | 845 |
DXXX | 849 |
DXXXI | 851 |
DXXXII | 853 |
DXXXIII | 855 |
DXXXIV | 857 |
DXXXV | 858 |
DXXXVI | 859 |
DXXXVIII | 860 |
DXXXIX | 862 |
DXL | 864 |
DXLI | 865 |
DXLII | 866 |
DXLIII | 867 |
DXLIV | 868 |
DXLV | 869 |
DXLVI | 870 |
DXLVII | 871 |
DXLVIII | 877 |
DXLIX | 878 |
DL | 879 |
DLI | 889 |
DLII | 892 |
DLIII | 893 |
DLIV | 895 |
DLVI | 896 |
DLVII | 897 |
DLVIII | 899 |
DLIX | 900 |
DLX | 901 |
DLXII | 902 |
DLXIII | 903 |
DLXIV | 904 |
DLXV | 905 |
DLXVI | 907 |
DLXVII | 908 |
DLXIX | 909 |
DLXX | 911 |
DLXXI | 913 |
DLXXII | 918 |
DLXXIII | 921 |
DLXXIV | 923 |
DLXXV | 925 |
DLXXVI | 926 |
DLXXVII | 928 |
DLXXVIII | 930 |
DLXXIX | 931 |
DLXXX | 934 |
DLXXXII | 935 |
DLXXXIII | 937 |
DLXXXIV | 940 |
DLXXXV | 943 |
DLXXXVII | 944 |
DLXXXIX | 946 |
DXC | 947 |
DXCI | 949 |
DXCII | 951 |
DXCIII | 953 |
DXCIV | 954 |
DXCV | 956 |
DXCVI | 958 |
DXCVII | 959 |
DXCVIII | 960 |
DXCIX | 962 |
DC | 964 |
DCI | 967 |
DCII | 968 |
DCIII | 969 |
DCV | 970 |
DCVI | 973 |
DCVIII | 975 |
DCIX | 976 |
DCX | 981 |
DCXI | 982 |
DCXIII | 983 |
DCXIV | 984 |
DCXV | 985 |
DCXVI | 986 |
DCXVII | 987 |
DCXVIII | 989 |
DCXIX | 990 |
DCXX | 992 |
DCXXI | 993 |
DCXXIII | 994 |
DCXXIV | 995 |
DCXXV | 996 |
DCXXVI | 1005 |
DCXXVIII | 1006 |
DCXXIX | 1007 |
DCXXX | 1008 |
DCXXXI | 1011 |
DCXXXII | 1015 |
DCXXXIII | 1017 |
DCXXXIV | 1018 |
DCXXXV | 1020 |
DCXXXVI | 1021 |
DCXXXVII | 1023 |
DCXXXVIII | 1025 |
DCXXXIX | 1028 |
DCXL | 1029 |
DCXLI | 1030 |
DCXLII | 1034 |
DCXLIII | 1035 |
DCXLV | 1037 |
DCXLVI | 1038 |
DCXLVII | 1040 |
DCXLVIII | 1044 |
DCXLIX | 1045 |
DCLI | 1046 |
DCLII | 1047 |
DCLIII | 1049 |
DCLIV | 1051 |
DCLV | 1052 |
DCLVI | 1055 |
DCLVII | 1058 |
DCLIX | 1061 |
DCLX | 1062 |
DCLXI | 1063 |
DCLXII | 1066 |
DCLXIII | 1067 |
DCLXIV | 1074 |
DCLXV | 1077 |
DCLXVI | 1078 |
DCLXVII | 1081 |
DCLXVIII | 1083 |
DCLXIX | 1084 |
DCLXX | 1085 |
DCLXXI | 1086 |
DCLXXIII | 1088 |
DCLXXV | 1090 |
DCLXXVI | 1091 |
DCLXXVII | 1093 |
DCLXXVIII | 1095 |
DCLXXX | 1096 |
DCLXXXI | 1098 |
DCLXXXIII | 1099 |
DCLXXXIV | 1101 |
DCLXXXV | 1102 |
DCLXXXVI | 1103 |
DCLXXXVII | 1104 |
DCLXXXVIII | 1106 |
DCXC | 1108 |
DCXCI | 1109 |
DCXCII | 1110 |
DCXCIII | 1111 |
DCXCIV | 1112 |
DCXCVI | 1113 |
DCXCVII | 1115 |
DCXCVIII | 1116 |
DCXCIX | 1118 |
DCCI | 1120 |
DCCII | 1122 |
DCCIII | 1123 |
DCCIV | 1125 |
DCCV | 1126 |
DCCVI | 1130 |
DCCVII | 1131 |
DCCVIII | 1133 |
DCCIX | 1135 |
DCCXI | 1137 |
DCCXII | 1138 |
DCCXIII | 1142 |
DCCXIV | 1143 |
DCCXV | 1145 |
DCCXVI | 1146 |
DCCXVII | 1147 |
DCCXVIII | 1148 |
DCCXIX | 1149 |
DCCXX | 1152 |
DCCXXI | 1155 |
DCCXXII | 1159 |
DCCXXIV | 1167 |
DCCXXV | 1172 |
DCCXXVI | 1173 |
DCCXXVIII | 1175 |
DCCXXIX | 1176 |
DCCXXX | 1186 |
DCCXXXI | 1187 |
DCCXXXII | 1188 |
DCCXXXIII | 1194 |
DCCXXXIV | 1196 |
DCCXXXV | 1200 |
DCCXXXVI | 1201 |
DCCXXXVII | 1203 |
DCCXXXVIII | 1204 |
DCCXXXIX | 1206 |
DCCXL | 1207 |
DCCXLII | 1208 |
DCCXLIII | 1213 |
DCCXLIV | 1216 |
DCCXLV | 1217 |
DCCXLVI | 1219 |
DCCXLVII | 1221 |
DCCXLIX | 1222 |
DCCL | 1223 |
DCCLII | 1224 |
DCCLIII | 1225 |
DCCLIV | 1227 |
DCCLV | 1228 |
DCCLVI | 1230 |
DCCLVII | 1233 |
DCCLVIII | 1234 |
DCCLIX | 1236 |
DCCLX | 1238 |
DCCLXI | 1241 |
DCCLXII | 1242 |
DCCLXIII | 1243 |
DCCLXIV | 1244 |
DCCLXV | 1245 |
DCCLXVI | 1247 |
DCCLXVII | 1248 |
DCCLXVIII | 1249 |
DCCLXIX | 1251 |
DCCLXXI | 1254 |
DCCLXXII | 1255 |
DCCLXXIII | 1257 |
DCCLXXIV | 1261 |
DCCLXXV | 1262 |
DCCLXXVI | 1263 |
DCCLXXVII | 1265 |
DCCLXXVIII | 1266 |
DCCLXXX | 1271 |
DCCLXXXI | 1273 |
DCCLXXXII | 1275 |
DCCLXXXIII | 1276 |
DCCLXXXIV | 1279 |
DCCLXXXVI | 1283 |
DCCLXXXVII | 1285 |
DCCLXXXVIII | 1286 |
DCCLXXXIX | 1287 |
DCCXC | 1288 |
DCCXCI | 1289 |
DCCXCII | 1290 |
DCCXCIII | 1291 |
DCCXCIV | 1292 |
DCCXCV | 1294 |
DCCXCVI | 1295 |
DCCXCVII | 1296 |
DCCXCIX | 1299 |
DCCCI | 1302 |
DCCCII | 1304 |
DCCCIII | 1305 |
DCCCIV | 1307 |
DCCCVI | 1308 |
DCCCVII | 1309 |
DCCCVIII | 1311 |
DCCCIX | 1313 |
DCCCX | 1314 |
DCCCXI | 1316 |
DCCCXII | 1318 |
DCCCXIII | 1320 |
DCCCXV | 1323 |
DCCCXVI | 1325 |
DCCCXVII | 1326 |
DCCCXVIII | 1328 |
DCCCXX | 1329 |
DCCCXXI | 1330 |
DCCCXXII | 1331 |
DCCCXXIII | 1334 |
DCCCXXIV | 1341 |
DCCCXXV | 1342 |
DCCCXXVI | 1345 |
DCCCXXVII | 1348 |
DCCCXXVIII | 1350 |
DCCCXXIX | 1352 |
DCCCXXX | 1353 |
DCCCXXXI | 1354 |
DCCCXXXII | 1356 |
DCCCXXXIII | 1357 |
DCCCXXXIV | 1361 |
DCCCXXXV | 1367 |
DCCCXXXVI | 1368 |
DCCCXXXVII | 1371 |
DCCCXXXVIII | 1373 |
DCCCXXXIX | 1375 |
DCCCXL | 1376 |
DCCCXLIII | 1377 |
DCCCXLV | 1378 |
DCCCXLVII | 1379 |
DCCCXLVIII | 1380 |
DCCCXLIX | 1381 |
DCCCL | 1383 |
DCCCLI | 1384 |
DCCCLII | 1386 |
DCCCLIII | 1387 |
DCCCLIV | 1392 |
DCCCLV | 1394 |
DCCCLVI | 1395 |
DCCCLVII | 1397 |
DCCCLVIII | 1399 |
DCCCLIX | 1400 |
DCCCLX | 1401 |
DCCCLXI | 1402 |
DCCCLXIII | 1403 |
DCCCLXIV | 1404 |
DCCCLXV | 1406 |
DCCCLXVII | 1407 |
DCCCLXVIII | 1408 |
DCCCLXX | 1409 |
DCCCLXXI | 1413 |
DCCCLXXII | 1415 |
DCCCLXXIV | 1416 |
DCCCLXXV | 1417 |
DCCCLXXVI | 1418 |
DCCCLXXVII | 1419 |
DCCCLXXIX | 1420 |
DCCCLXXX | 1421 |
DCCCLXXXII | 1422 |
DCCCLXXXIII | 1423 |
DCCCLXXXIV | 1424 |
DCCCLXXXV | 1425 |
DCCCLXXXVII | 1426 |
DCCCLXXXVIII | 1428 |
DCCCLXXXIX | 1429 |
DCCCXCI | 1430 |
DCCCXCII | 1431 |
DCCCXCIV | 1434 |
DCCCXCV | 1437 |
DCCCXCVI | 1439 |
DCCCXCVII | 1440 |
DCCCXCVIII | 1444 |
DCCCXCIX | 1447 |
CMI | 1448 |
CMII | 1450 |
CMIII | 1453 |
CMIV | 1463 |
CMV | 1767 |
CMVI | 1807 |
CMVII | 1880 |
Andere Ausgaben - Alle anzeigen
Combinatorial Optimization: Polyhedra and Efficiency, Band 1 Alexander Schrijver Keine Leseprobe verfügbar - 2003 |
Häufige Begriffe und Wortgruppen
assume b-edge cover b-matching B₁ base bipartite graph called characterization common transversal components contains contradicting convex hull Corollary cubic graph Define denote digraph directed circuit Directly from Theorem disjoint edge cover edge-colouring Edmonds equal equivalent exists finite flow forest Fulkerson Gabow given gives graph and let graph G Hence implies incidence matrix incidence vectors inclusionwise inequality integer vector iterations König's lattice length function Let G linear programming Lovász M₁ matching-covered matroid maximal maximum number maximum-weight Menger's theorem method min-max min-max relation minimal minimum-cost minimum-size Moreover nonempty nonnegative NP-complete O(nm partial transversal partially ordered set partition perfect matching Petersen graph planar graph polyhedra polyhedron polymatroids polynomial-time algorithm problem Proof r-arborescence reset satisfying set polytope shortest path spanning tree st path strongly polynomial submodular function subset T-join Tarjan total dual integrality total unimodularity undirected graph vertex cover weight
Verweise auf dieses Buch
Combinatorial Optimization: Theory and Algorithms Bernhard H. Korte,Jens Vygen Keine Leseprobe verfügbar - 2006 |