Stable Homotopy Theory Lectures Delivered at the University of California at Berkeley 1961
| Author/creator | Adams, J. F. Author |
| Other author | Vasquez, A. T. Notes by |
| Format | Electronic |
| Publication Info | New York : Springer |
| Description | iii, 77 p. ill |
| Supplemental Content | Full text available from SpringerLINK Lecture Notes in Mathematics |
| Supplemental Content | Full text available from Springer Books |
| Series | Lecture Notes in Mathematics Ser. 3 |
| Summary | Annotation Before I get down to the business of exposition, I'd like to offer a little motivation. I want to show that there are one or two places in homotopy theory where we strongly suspect that there is something systematic going on, but where we are not yet sure what the system is. The first question concerns the stable J-homomorphism. I recall that this is a homomorphism J: ~ (SQ) ~ ~S = ~ + (Sn), n large. r r r n It is of interest to the differential topologists. Since Bott, we know that ~ (SO) is periodic with period 8: r 6 8 r = 1 2 3 4 5 7 9· . · Z o o o z On the other hand, ~S is not known, but we can nevertheless r ask about the behavior of J. The differential topologists prove: 2 Th~~: If I' = ~ - 1, so that 'IT"r(SO) ~ 2, then J('IT"r(SO)) = 2m where m is a multiple of the denominator of ~/4k th (l\. being in the Pc Bepnoulli numher.) Conject~~: The above result is best possible, i.e. J('IT"r(SO)) = 2m where m 1s exactly this denominator. status of conJectuI'e ~ No proof in sight. Q9njecture Eo If I' = 8k or 8k + 1, so that 'IT"r(SO) = Z2' then J('IT"r(SO)) = 2 , 2 status of conjecture: Probably provable, but this is work in progl'ess. |
| Access restriction | Available only to authorized users. |
| Technical details | Mode of access: World Wide Web |
| Genre/form | Electronic books. |
| ISBN | 9783662159422 |
| ISBN | 3662159422 (E-Book) Active Record |
| Standard identifier# | 9783662159422 |
| Stock number | 10.1007/978-3-662-15942-2 00024965 |