Vol. 128, No. 1, 1987

Download this article
Download this article. For screen
For printing
Recent Issues
Vol. 332: 1  2
Vol. 331: 1  2
Vol. 330: 1  2
Vol. 329: 1  2
Vol. 328: 1  2
Vol. 327: 1  2
Vol. 326: 1  2
Vol. 325: 1  2
Online Archive
Volume:
Issue:
     
The Journal
About the journal
Ethics and policies
Peer-review process
 
Submission guidelines
Submission form
Editorial board
Officers
 
Subscriptions
 
ISSN 1945-5844 (electronic)
ISSN 0030-8730 (print)
 
Special Issues
Author index
To appear
 
Other MSP journals
The eta invariant, Pinc bordism, and equivariant Spinc bordism for cyclic 2-groups

Anthony Peter Bahri and Peter Gilkey

Vol. 128 (1987), No. 1, 1–24
Abstract

The eta invariant and equivariant Stiefel-Whitney numbers completely detect Zn equivariant Spinc bordism and Pinc bordism. The additive structure of Pinc bordism and of equivariant Spinc bordism for cyclic 2-groups is determined using these invariants in terms of K-theory. The analysis is used to embed the K-theory in the bordism.

Mathematical Subject Classification 2000
Primary: 57R90
Secondary: 58G10
Milestones
Received: 14 November 1985
Revised: 17 June 1986
Published: 1 May 1987
Authors
Anthony Peter Bahri
Peter Gilkey
Mathematics Department
University of Oregon
Eugene OR 97403
United States