Periodic approximation of exceptional lyapunov exponents for semi-invertible operator cocycles

dc.contributor.author	Backes, Lucas Henrique	pt_BR
dc.contributor.author	Dragičević, Davor	pt_BR
dc.date.accessioned	2020-02-06T04:18:02Z	pt_BR
dc.date.issued	2019	pt_BR
dc.identifier.issn	1798-2383	pt_BR
dc.identifier.uri	http://hdl.handle.net/10183/205537	pt_BR
dc.description.abstract	We prove that for semi-invertible and Hölder continuous linear cocycles A acting on an arbitrary Banach space and defined over a base space that satisfies the Anosov closing property, all exceptional Lyapunov exponents of A with respect to an ergodic invariant measure for base dynamics can be approximated with Lyapunov exponents of A with respect to ergodic measures supported on periodic orbits. Our result is applicable to a wide class of infinite-dimensional dynamical systems.	en
dc.format.mimetype	application/pdf	pt_BR
dc.language.iso	eng	pt_BR
dc.relation.ispartof	Annales Academiæ Scientiarum Fennicæ. Helsinki, Finland, Academia Scientiarum Fennica, 2019. Vol. 44, 2019, p. 183 – 209	pt_BR
dc.rights	Open Access	en
dc.subject	Expoentes de Lyapunov	pt_BR
dc.subject	Subespaços invariantes	pt_BR
dc.subject	Continuidade	pt_BR
dc.subject	Espaço de Banach	pt_BR
dc.title	Periodic approximation of exceptional lyapunov exponents for semi-invertible operator cocycles	pt_BR
dc.type	Artigo de periódico	pt_BR
dc.identifier.nrb	001103369	pt_BR
dc.type.origin	Estrangeiro	pt_BR

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