Knowledge

742: 860: 189: 364: 811: 407: 303: 646: 387: 672: 603: 583: 493: 473: 563: 528: 453: 338: 680: 1044: 1001: 921: 50: 816: 1080: 876: 972: 993: 243: 227: 167: 343: 1075: 755: 69: 392: 252: 945: 612: 410: 211: 369: 239: 65: 1054: 1011: 891: 86: 8: 916: 651: 113: 896: 588: 568: 478: 458: 207: 533: 498: 426: 311: 1070: 1040: 1022: 997: 886: 203: 117: 105: 93: 73: 39: 1032: 871: 215: 1050: 1028: 1007: 987: 906: 144: 749: 97: 1064: 606: 413: 199: 36: 1018: 941: 420:, modulo the quotients needed to convert the products to reduced products. 206: 983: 223: 24: 609:, and the aforementioned isomorphism is of those groups. Thus, setting 210:. This adjunction accounts for much of the importance of loop spaces in 1036: 911: 901: 881: 813: 417: 219: 83: 20: 1027:, Lecture Notes in Mathematics, vol. 271, Berlin, New York: 195: 54: 973: 737:{\displaystyle \pi _{k}(X)\approxeq \pi _{k-1}(\Omega X)} 160: 819: 758: 683: 654: 615: 591: 571: 536: 501: 481: 461: 455: 429: 395: 372: 346: 314: 255: 170: 242: 854: 805: 736: 666: 640: 597: 577: 557: 522: 487: 467: 447: 401: 381: 358: 332: 297: 183: 1062: 222:, where the cartesian product is adjoint to the 992:, Annals of Mathematics Studies, vol. 90, 416:. This homeomorphism is essentially that of 141:are formed by applying Ω a number of times. 72:. With this operation, the loop space is an 233: 340:is the set of homotopy classes of maps 1063: 947:A Concise Course in Algebraic Topology 565:do have natural group structures when 198:, the free loop space construction is 982: 226:.) Informally this is referred to as 152:is the space of maps from the circle 1024:The Geometry of Iterated Loop Spaces 855:{\displaystyle S^{k}=\Sigma S^{k-1}} 1017: 940: 13: 934: 833: 725: 546: 505: 373: 286: 259: 173: 14: 1092: 104:, i.e. the set of based-homotopy 82:. That is, the multiplication is 68:. Two loops can be multiplied by 45:is the space of (based) loops in 495:. However, it can be shown that 246:. The basic observation is that 922:Path space (algebraic topology) 674:sphere) gives the relationship 184:{\displaystyle {\mathcal {L}}X} 966: 800: 781: 775: 769: 731: 722: 700: 694: 552: 537: 517: 502: 442: 430: 359:{\displaystyle A\rightarrow B} 350: 327: 315: 292: 277: 271: 256: 238:The loop space is dual to the 53:pointed maps from the pointed 1: 927: 806:{\displaystyle \pi _{k}(X)=} 389:is the suspension of A, and 7: 953:, U. Chicago Press, Chicago 865: 214:. (A related phenomenon in 10: 1097: 994:Princeton University Press 962:(See chapter 8, section 2) 402:{\displaystyle \approxeq } 298:{\displaystyle \approxeq } 641:{\displaystyle Z=S^{k-1}} 382:{\displaystyle \Sigma A} 877:Eilenberg–MacLane space 748:This follows since the 148:of a topological space 856: 807: 738: 668: 642: 599: 579: 559: 524: 489: 469: 449: 403: 383: 360: 334: 299: 244:Eckmann–Hilton duality 234:Eckmann–Hilton duality 228:Eckmann–Hilton duality 212:stable homotopy theory 185: 857: 808: 739: 669: 643: 600: 580: 560: 525: 490: 470: 450: 404: 384: 361: 335: 300: 186: 66:compact-open topology 989:Infinite loop spaces 817: 756: 681: 652: 613: 589: 569: 534: 499: 479: 459: 427: 393: 370: 344: 312: 253: 168: 164:is often denoted by 135:iterated loop spaces 64:, equipped with the 917:Spectrum (topology) 667:{\displaystyle k-1} 106:equivalence classes 84:homotopy-coherently 1081:Topological spaces 1037:10.1007/BFb0067491 897:List of topologies 852: 803: 734: 664: 638: 595: 575: 555: 520: 485: 465: 445: 399: 379: 356: 330: 295: 208:reduced suspension 181: 108:of based loops in 1046:978-3-540-05904-2 1003:978-0-691-08207-3 984:Adams, John Frank 892:Gray's conjecture 887:Fundamental group 598:{\displaystyle X} 578:{\displaystyle Z} 488:{\displaystyle B} 468:{\displaystyle A} 204:cartesian product 118:fundamental group 40:topological space 16:Topological space 1088: 1057: 1014: 975: 970: 964: 960: 959: 958: 952: 938: 872:Bott periodicity 861: 859: 858: 853: 851: 850: 829: 828: 812: 810: 809: 804: 793: 792: 768: 767: 743: 741: 740: 735: 721: 720: 693: 692: 673: 671: 670: 665: 647: 645: 644: 639: 637: 636: 604: 602: 601: 596: 584: 582: 581: 576: 564: 562: 561: 558:{\displaystyle } 556: 529: 527: 526: 523:{\displaystyle } 521: 494: 492: 491: 486: 474: 472: 471: 466: 454: 452: 451: 448:{\displaystyle } 446: 408: 406: 405: 400: 388: 386: 385: 380: 365: 363: 362: 357: 339: 337: 336: 333:{\displaystyle } 331: 304: 302: 301: 296: 216:computer science 190: 188: 187: 182: 177: 176: 1096: 1095: 1091: 1090: 1089: 1087: 1086: 1085: 1076:Homotopy theory 1061: 1060: 1047: 1029:Springer-Verlag 1004: 979: 978: 971: 967: 956: 954: 950: 939: 935: 930: 907:Path (topology) 868: 840: 836: 824: 820: 818: 815: 814: 788: 784: 763: 759: 757: 754: 753: 710: 706: 688: 684: 682: 679: 678: 653: 650: 649: 626: 622: 614: 611: 610: 590: 587: 586: 570: 567: 566: 535: 532: 531: 500: 497: 496: 480: 477: 476: 460: 457: 456: 428: 425: 424: 394: 391: 390: 371: 368: 367: 345: 342: 341: 313: 310: 309: 254: 251: 250: 236: 172: 171: 169: 166: 165: 146:free loop space 125: 98:path components 79: 17: 12: 11: 5: 1094: 1084: 1083: 1078: 1073: 1059: 1058: 1045: 1015: 1002: 977: 976: 965: 932: 931: 929: 926: 925: 924: 919: 914: 909: 904: 899: 894: 889: 884: 879: 874: 867: 864: 849: 846: 843: 839: 835: 832: 827: 823: 802: 799: 796: 791: 787: 783: 780: 777: 774: 771: 766: 762: 752:is defined as 750:homotopy group 746: 745: 733: 730: 727: 724: 719: 716: 713: 709: 705: 702: 699: 696: 691: 687: 663: 660: 657: 635: 632: 629: 625: 621: 618: 594: 574: 554: 551: 548: 545: 542: 539: 519: 516: 513: 510: 507: 504: 484: 464: 444: 441: 438: 435: 432: 398: 378: 375: 355: 352: 349: 329: 326: 323: 320: 317: 306: 305: 294: 291: 288: 285: 282: 279: 276: 273: 270: 267: 264: 261: 258: 235: 232: 180: 175: 123: 77: 23:, a branch of 15: 9: 6: 4: 3: 2: 1093: 1082: 1079: 1077: 1074: 1072: 1069: 1068: 1066: 1056: 1052: 1048: 1042: 1038: 1034: 1030: 1026: 1025: 1020: 1019:May, J. Peter 1016: 1013: 1009: 1005: 999: 995: 991: 990: 985: 981: 980: 974: 969: 963: 949: 948: 943: 937: 933: 923: 920: 918: 915: 913: 910: 908: 905: 903: 900: 898: 895: 893: 890: 888: 885: 883: 880: 878: 875: 873: 870: 869: 863: 847: 844: 841: 837: 830: 825: 821: 797: 794: 789: 785: 778: 772: 764: 760: 751: 728: 717: 714: 711: 707: 703: 697: 689: 685: 677: 676: 675: 661: 658: 655: 633: 630: 627: 623: 619: 616: 608: 592: 572: 549: 543: 540: 514: 511: 508: 482: 462: 439: 436: 433: 421: 419: 415: 414:homeomorphism 412: 396: 376: 353: 347: 324: 321: 318: 289: 283: 280: 274: 268: 265: 262: 249: 248: 247: 245: 241: 231: 229: 225: 221: 217: 213: 209: 205: 201: 200:right adjoint 197: 192: 178: 163: 159: 155: 151: 147: 142: 140: 136: 131: 129: 122: 119: 115: 111: 107: 103: 99: 95: 90: 88: 85: 81: 76: 71: 70:concatenation 67: 63: 59: 56: 52: 48: 44: 41: 38: 34: 30: 26: 22: 1023: 988: 968: 961: 955:, retrieved 946: 936: 747: 423:In general, 422: 409:denotes the 307: 237: 193: 161: 157: 153: 149: 145: 143: 138: 134: 132: 127: 120: 109: 101: 91: 74: 61: 57: 46: 42: 32: 28: 18: 224:hom functor 87:associative 25:mathematics 1065:Categories 957:2016-08-27 942:May, J. P. 928:References 912:Quasigroup 902:Loop group 240:suspension 51:continuous 29:loop space 882:Free loop 845:− 834:Σ 761:π 726:Ω 715:− 708:π 704:≊ 686:π 659:− 631:− 547:Ω 506:Σ 397:≊ 374:Σ 351:→ 287:Ω 275:≊ 260:Σ 1071:Topology 1021:(1972), 986:(1978), 944:(1999), 866:See also 418:currying 220:currying 21:topology 1055:0420610 1012:0505692 607:pointed 411:natural 196:functor 112:, is a 49:, i.e. 37:pointed 1053:  1043:  1010:  1000:  366:, and 308:where 121:π 116:, the 80:-space 55:circle 27:, the 951:(PDF) 648:(the 194:As a 114:group 35:of a 1041:ISBN 998:ISBN 605:are 585:and 530:and 475:and 133:The 100:of Ω 92:The 1033:doi 218:is 202:to 191:. 156:to 137:of 130:). 96:of 94:set 60:to 19:In 1067:: 1051:MR 1049:, 1039:, 1031:, 1008:MR 1006:, 996:, 862:. 230:. 89:. 1035:: 848:1 842:k 838:S 831:= 826:k 822:S 801:] 798:X 795:, 790:k 786:S 782:[ 779:= 776:) 773:X 770:( 765:k 744:. 732:) 729:X 723:( 718:1 712:k 701:) 698:X 695:( 690:k 662:1 656:k 634:1 628:k 624:S 620:= 617:Z 593:X 573:Z 553:] 550:X 544:, 541:Z 538:[ 518:] 515:X 512:, 509:Z 503:[ 483:B 463:A 443:] 440:B 437:, 434:A 431:[ 377:A 354:B 348:A 328:] 325:B 322:, 319:A 316:[ 293:] 290:X 284:, 281:Z 278:[ 272:] 269:X 266:, 263:Z 257:[ 179:X 174:L 162:X 158:X 154:S 150:X 139:X 128:X 126:( 124:1 110:X 102:X 78:∞ 75:A 62:X 58:S 47:X 43:X 33:X 31:Ω