| ID | 53043 |
| FullText URL | |
| Author |
Qi, Yan
|
| Abstract | A generator of the reduced KO-group of the real projective space of dimension n is related to the canonical line bundle γ. In
the present paper, we will prove that for a finite group G of odd order and a real G-representation U of dimension 2n, in the reduced G-equivariant KO-group of the real projective space associated with the
G-representation R ⊕ U, the element 2n+2[γ] is equal to zero.
|
| Keywords | equivariant real vector bundle
group action
real projective space
canonical line bundle
product bundle
|
| Published Date | 2015-01
|
| Publication Title |
Mathematical Journal of Okayama University
|
| Volume | volume57
|
| Issue | issue1
|
| Publisher | Department of Mathematics, Faculty of Science, Okayama University
|
| Start Page | 111
|
| End Page | 122
|
| ISSN | 0030-1566
|
| NCID | AA00723502
|
| Content Type |
Journal Article
|
| language |
English
|
| Copyright Holders | Copyright©2015 by the Editorial Board of Mathematical Journal of Okayama University
|
| File Version | publisher
|
| Refereed |
True
|
| Submission Path | mjou/vol57/iss1/6
|
| JaLCDOI |
