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Title: Embedding of a Urysohn differentiable manifold with corners in a real Banach space (English)
Author: Armas-Gómez, S.
Author: Margalef-Roig, J.
Author: Outerolo-Domínguez, E.
Author: Padrón-Fernández, E.
Language: English
Journal: Proceedings of the Winter School "Geometry and Physics"
Volume:
Issue: 1991
Year:
Pages: [143]-152
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Category: math
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Summary: Summary: We prove a characterization of the immersions in the context of infinite dimensional manifolds with corners, we prove that a Hausdorff paracompact $C^p$-manifold whose charts are modelled over real Banach spaces which fulfil the Urysohn $C^p$-condition can be embedded in a real Banach space, $E$, by means of a closed embedding, $f$, such that, locally, its image is a totally neat submanifold of a quadrant of a closed vector subspace of $E$ and finally we prove that a Hausdorff paracompact topological space, $X$, is a Hilbert $C^\infty$-manifold without boundary if and only if $X$ is homeomorphic to $A$, where $A$ is a $C^\infty$-retract of an open set of a real Hilbert space. (English)
MSC: 57N20
MSC: 58B10
MSC: 58C15
idZBL: Zbl 0871.57018
idMR: MR1246628
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Date available: 2009-07-13T21:29:41Z
Last updated: 2012-09-18
Stable URL: http://hdl.handle.net/10338.dmlcz/701513
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