C^k invariant manifolds for infinite delay

For a non-autonomous delay difference equation with infinite delay, we construct smooth stable and unstable invariant manifolds for any sufficiently small perturbation of an exponential dichotomy. We consider a general class of norms on the phase space satisfying an axiom considered by Matsunaga...

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Bibliographic Details
Main Authors:	Luis Barreira, Claudia Valls
Format:	Article
Language:	English
Published:	Texas State University 2019-04-01
Series:	Electronic Journal of Differential Equations
Subjects:	Difference equations infinite delay invariant manifolds
Online Access:	http://ejde.math.txstate.edu/Volumes/2019/50/abstr.html

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record_format	Article
spelling	doaj-eda1675175b04837b0f156f2fcb73d632020-11-25T02:34:11ZengTexas State UniversityElectronic Journal of Differential Equations1072-66912019-04-01201950,115C^k invariant manifolds for infinite delayLuis Barreira0Claudia Valls1 Univ. de Lisboa, Portugal Univ. de Lisboa, Portugal For a non-autonomous delay difference equation with infinite delay, we construct smooth stable and unstable invariant manifolds for any sufficiently small perturbation of an exponential dichotomy. We consider a general class of norms on the phase space satisfying an axiom considered by Matsunaga and Murakami that goes back to earlier work by Hale and Kato for continuous time. In addition, we show that the invariant manifolds are as regular as the perturbation. Finally, we consider briefly the case of center manifolds and we formulate corresponding results.http://ejde.math.txstate.edu/Volumes/2019/50/abstr.htmlDifference equationsinfinite delayinvariant manifolds
collection	DOAJ
language	English
format	Article
sources	DOAJ
author	Luis Barreira Claudia Valls
spellingShingle	Luis Barreira Claudia Valls C^k invariant manifolds for infinite delay Electronic Journal of Differential Equations Difference equations infinite delay invariant manifolds
author_facet	Luis Barreira Claudia Valls
author_sort	Luis Barreira
title	C^k invariant manifolds for infinite delay
title_short	C^k invariant manifolds for infinite delay
title_full	C^k invariant manifolds for infinite delay
title_fullStr	C^k invariant manifolds for infinite delay
title_full_unstemmed	C^k invariant manifolds for infinite delay
title_sort	c^k invariant manifolds for infinite delay
publisher	Texas State University
series	Electronic Journal of Differential Equations
issn	1072-6691
publishDate	2019-04-01
description	For a non-autonomous delay difference equation with infinite delay, we construct smooth stable and unstable invariant manifolds for any sufficiently small perturbation of an exponential dichotomy. We consider a general class of norms on the phase space satisfying an axiom considered by Matsunaga and Murakami that goes back to earlier work by Hale and Kato for continuous time. In addition, we show that the invariant manifolds are as regular as the perturbation. Finally, we consider briefly the case of center manifolds and we formulate corresponding results.
topic	Difference equations infinite delay invariant manifolds
url	http://ejde.math.txstate.edu/Volumes/2019/50/abstr.html
work_keys_str_mv	AT luisbarreira ckinvariantmanifoldsforinfinitedelay AT claudiavalls ckinvariantmanifoldsforinfinitedelay
_version_	1724809697865760768

C^k invariant manifolds for infinite delay

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