Knowledge (XXG)

343: 83: 165: 413: 384: 103: 269: 220: 156: 60: 408: 223:; Mann, Benjamin M.; Milgram, R. James (1993), "The topology of instanton moduli spaces. I. The Atiyah–Jones conjecture", 377: 418: 302: 370: 311: 72: 32: 225: 112: 316: 289: 250: 208: 174: 144: 403: 242: 192: 128: 98: 44: 354: 321: 281: 234: 184: 160: 120: 56: 262: 204: 140: 258: 200: 136: 116: 94: 48: 397: 293: 148: 212: 188: 76: 71:). The more general version of the Atiyah–Jones conjecture is a question about the 36: 300: 43:. The original form of the conjecture considered instantons over a 4-dimensional 20: 326: 285: 80: 40: 28: 246: 196: 132: 342: 272:; Milgram, R. J. (1995), "The Atiyah-Jones conjecture for ruled surfaces", 350: 254: 124: 179: 238: 68: 64: 358: 63:, and Benjamin M. Mann et al. ( 274:Journal für die reine und angewandte Mathematik 16:Conjecture about the moduli space of instantons 378: 166:Bulletin of the American Mathematical Society 8: 52: 385: 371: 99:"Topological aspects of Yang-Mills theory" 325: 315: 178: 163:(1992), "The Atiyah–Jones conjecture", 104:Communications in Mathematical Physics 7: 339: 337: 51: and John D. S. Jones ( 357:. You can help Knowledge (XXG) by 14: 414:Conjectures that have been proved 341: 189:10.1090/S0273-0979-1992-00286-0 1: 97:; Jones, John D. S. (1978), 435: 336: 49:Michael Francis Atiyah 327:10.1016/j.aim.2008.03.004 286:10.1515/crll.1995.466.111 303:Advances in Mathematics 95:Atiyah, Michael Francis 47:. It was introduced by 25:Atiyah–Jones conjecture 409:Quantum chromodynamics 226:Annals of Mathematics 221:Hurtubise, Jacques C. 159:; Mann, Benjamin M.; 157:Hurtubise, Jacques C. 61:Jacques C. Hurtubise 57:Charles P. Boyer 219:Boyer, Charles P.; 155:Boyer, Charles P.; 117:1978CMaPh..61...97A 125:10.1007/bf01609489 366: 365: 229:, Second Series, 161:Milgram, R. James 426: 387: 380: 373: 351:topology-related 345: 338: 330: 329: 319: 310:(4): 1027–1050, 296: 270:Hurtubise, J. C. 265: 215: 182: 151: 55:) and proved by 434: 433: 429: 428: 427: 425: 424: 423: 394: 393: 392: 391: 334: 317:10.1.1.234.5222 299: 268: 239:10.2307/2946532 218: 154: 93: 90: 17: 12: 11: 5: 432: 430: 422: 421: 419:Topology stubs 416: 411: 406: 396: 395: 390: 389: 382: 375: 367: 364: 363: 346: 332: 331: 297: 266: 233:(3): 561–609, 216: 173:(2): 317–321, 169:, New Series, 152: 89: 86: 15: 13: 10: 9: 6: 4: 3: 2: 431: 420: 417: 415: 412: 410: 407: 405: 402: 401: 399: 388: 383: 381: 376: 374: 369: 368: 362: 360: 356: 353:article is a 352: 347: 344: 340: 335: 328: 323: 318: 313: 309: 305: 304: 298: 295: 291: 287: 283: 279: 275: 271: 267: 264: 260: 256: 252: 248: 244: 240: 236: 232: 228: 227: 222: 217: 214: 210: 206: 202: 198: 194: 190: 186: 181: 176: 172: 168: 167: 162: 158: 153: 150: 146: 142: 138: 134: 130: 126: 122: 118: 114: 111:(2): 97–118, 110: 106: 105: 100: 96: 92: 91: 87: 85: 82: 78: 77:moduli spaces 74: 70: 66: 62: 58: 54: 50: 46: 42: 38: 37:moduli spaces 34: 30: 26: 22: 359:expanding it 348: 333: 307: 301: 277: 273: 230: 224: 180:math/9204226 170: 164: 108: 102: 24: 18: 280:: 111–144, 21:mathematics 398:Categories 88:References 81:instantons 41:instantons 31:about the 29:conjecture 312:CiteSeerX 294:117414381 247:0003-486X 197:0002-9904 149:122490773 133:0010-3616 404:Topology 213:18497401 73:homology 33:homology 263:1217348 255:2946532 205:1130447 141:0503187 113:Bibcode 75:of the 35:of the 314:  292:  261:  253:  245:  211:  203:  195:  147:  139:  131:  59:, 45:sphere 23:, the 349:This 290:S2CID 251:JSTOR 209:S2CID 175:arXiv 145:S2CID 27:is a 355:stub 243:ISSN 193:ISSN 129:ISSN 69:1993 65:1992 53:1978 322:doi 308:218 282:doi 278:466 235:doi 231:137 185:doi 121:doi 79:of 39:of 19:In 400:: 320:, 306:, 288:, 276:, 259:MR 257:, 249:, 241:, 207:, 201:MR 199:, 191:, 183:, 171:26 143:, 137:MR 135:, 127:, 119:, 109:61 107:, 101:, 67:, 386:e 379:t 372:v 361:. 324:: 284:: 237:: 187:: 177:: 123:: 115::