Moser’s theorem on manifolds with corners

Bruveris, M; Michor, PW; Parusiński, A; Rainer, A

Please use this identifier to cite or link to this item: http://bura.brunel.ac.uk/handle/2438/19280

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DC Field	Value	Language
dc.contributor.author	Bruveris, M	-
dc.contributor.author	Michor, PW	-
dc.contributor.author	Parusiński, A	-
dc.contributor.author	Rainer, A	-
dc.date.accessioned	2019-10-09T11:33:07Z	-
dc.date.available	2018-08-10	-
dc.date.available	2019-10-09T11:33:07Z	-
dc.date.issued	2018-08-10	-
dc.identifier.citation	Proceedings of the American Mathematical Society, 2018, 146 (11), pp. 4889 - 4897	en_US
dc.identifier.issn	0002-9939	-
dc.identifier.issn	http://dx.doi.org/10.1090/proc/14130	-
dc.identifier.issn	1088-6826	-
dc.identifier.uri	http://bura.brunel.ac.uk/handle/2438/19280	-
dc.description.abstract	Moser's theorem states that the diffeomorphism group of a compact manifold acts transitively on the space of all smooth positive densities with fixed volume. Here we describe the extension of this result to manifolds with corners. In particular, we obtain Moser's theorem on simplices. The proof is based on Banyaga's paper (1974), where Moser's theorem is proven for manifolds with boundary. A cohomological interpretation of Banyaga's operator is given, which allows a proof of Lefschetz duality using differential forms.	en_US
dc.language	en	-
dc.language.iso	en	en_US
dc.publisher	American Mathematical Society (AMS)	en_US
dc.title	Moser’s theorem on manifolds with corners	en_US
dc.type	Article	en_US
dc.identifier.doi	http://dx.doi.org/10.1090/proc/14130	-
dc.relation.isPartOf	Proceedings of the American Mathematical Society	-
pubs.issue	11	-
pubs.publication-status	Published	-
pubs.volume	146	-
dc.identifier.eissn	1088-6826	-
Appears in Collections:	Dept of Mathematics Research Papers

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