Fixed Point Indices and Manifolds with Collars
This paper concerns a formula which relates the Lefschetz number L(f) for a map f:M --> M' to the fixed point index I(f) summed with the fixed point index of a derived map on part of the boundary of M. Here M is a compact manifold and M' is M with a collar attached. : Accepted for publi...
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ftdatacite:10.48550/arxiv.math/0505230 2023-05-15T17:21:30+02:00 Fixed Point Indices and Manifolds with Collars Benjamin, Chen-Farng Gottlieb, Daniel Henry 2005 https://dx.doi.org/10.48550/arxiv.math/0505230 https://arxiv.org/abs/math/0505230 unknown arXiv Assumed arXiv.org perpetual, non-exclusive license to distribute this article for submissions made before January 2004 http://arxiv.org/licenses/assumed-1991-2003/ Geometric Topology math.GT Algebraic Topology math.AT FOS Mathematics Preprint Article article CreativeWork 2005 ftdatacite https://doi.org/10.48550/arxiv.math/0505230 2022-04-01T16:05:55Z This paper concerns a formula which relates the Lefschetz number L(f) for a map f:M --> M' to the fixed point index I(f) summed with the fixed point index of a derived map on part of the boundary of M. Here M is a compact manifold and M' is M with a collar attached. : Accepted for publication in Fixed Point Theory and Applications as part of the proceedings of the Newfoundland conference on fixed points, 2004 Report Newfoundland DataCite Metadata Store (German National Library of Science and Technology) |
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Open Polar |
collection |
DataCite Metadata Store (German National Library of Science and Technology) |
op_collection_id |
ftdatacite |
language |
unknown |
topic |
Geometric Topology math.GT Algebraic Topology math.AT FOS Mathematics |
spellingShingle |
Geometric Topology math.GT Algebraic Topology math.AT FOS Mathematics Benjamin, Chen-Farng Gottlieb, Daniel Henry Fixed Point Indices and Manifolds with Collars |
topic_facet |
Geometric Topology math.GT Algebraic Topology math.AT FOS Mathematics |
description |
This paper concerns a formula which relates the Lefschetz number L(f) for a map f:M --> M' to the fixed point index I(f) summed with the fixed point index of a derived map on part of the boundary of M. Here M is a compact manifold and M' is M with a collar attached. : Accepted for publication in Fixed Point Theory and Applications as part of the proceedings of the Newfoundland conference on fixed points, 2004 |
format |
Report |
author |
Benjamin, Chen-Farng Gottlieb, Daniel Henry |
author_facet |
Benjamin, Chen-Farng Gottlieb, Daniel Henry |
author_sort |
Benjamin, Chen-Farng |
title |
Fixed Point Indices and Manifolds with Collars |
title_short |
Fixed Point Indices and Manifolds with Collars |
title_full |
Fixed Point Indices and Manifolds with Collars |
title_fullStr |
Fixed Point Indices and Manifolds with Collars |
title_full_unstemmed |
Fixed Point Indices and Manifolds with Collars |
title_sort |
fixed point indices and manifolds with collars |
publisher |
arXiv |
publishDate |
2005 |
url |
https://dx.doi.org/10.48550/arxiv.math/0505230 https://arxiv.org/abs/math/0505230 |
genre |
Newfoundland |
genre_facet |
Newfoundland |
op_rights |
Assumed arXiv.org perpetual, non-exclusive license to distribute this article for submissions made before January 2004 http://arxiv.org/licenses/assumed-1991-2003/ |
op_doi |
https://doi.org/10.48550/arxiv.math/0505230 |
_version_ |
1766106168416010240 |