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The eta invariant,
Pinc bordism, and equivariant Spinc
bordism for cyclic 2-groups
Anthony Peter Bahri and Peter Gilkey |
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Vol. 128 (1987), No. 1, 1–24
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Abstract |
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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
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Milestones
Received: 14 November 1985
Revised: 17 June 1986
Published: 1 May 1987
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Authors |
| Anthony Peter Bahri | |
| Peter Gilkey | |
| Mathematics Department University of Oregon Eugene OR 97403 United States |
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