Density of the level sets of the metric mean dimension for homeomorphisms

Muentes Acevedo, Jeovanny de Jesus; Romaña Ibarra, Sergio; Arias Cantillo, Raibel

dc.contributor.author	Muentes Acevedo, Jeovanny de Jesus
dc.contributor.author	Romaña Ibarra, Sergio
dc.contributor.author	Arias Cantillo, Raibel
dc.date.accessioned	2024-02-12T15:47:28Z
dc.date.available	2024-02-12T15:47:28Z
dc.date.issued	2023-12-10
dc.date.submitted	2024-02-12
dc.identifier.citation	Acevedo, J.M., Romaña, S. & Arias, R. Density of the Level Sets of the Metric Mean Dimension for Homeomorphisms. J Dyn Diff Equat (2024). https://doi.org/10.1007/s10884-023-10344-5	spa
dc.identifier.uri	https://hdl.handle.net/20.500.12585/12632
dc.description.abstract	Let N be an n-dimensional compact riemannian manifold, with n ≥ 2. In this paper, we prove that for any α ∈ [0, n], the set consisting of homeomorphisms on N with lower and upper metric mean dimensions equal to α is dense in Hom(N). More generally, given α, β ∈ [0, n], with α ≤ β, we show the set consisting of homeomorphisms on N with lower metric mean dimension equal to α and upper metric mean dimension equal to β is dense in Hom(N). Furthermore, we also give a proof that the set of homeomorphisms withupper metric mean dimension equal to n is residual in Hom(N).	spa
dc.format.extent	14 páginas
dc.format.mimetype	application/http	spa
dc.language.iso	eng	spa
dc.rights.uri	http://creativecommons.org/publicdomain/zero/1.0/	*
dc.source	Journal of Dynamics and Differential Equations	spa
dc.title	Density of the level sets of the metric mean dimension for homeomorphisms	spa
dcterms.bibliographicCitation	Acevedo, J.M., Romaña, S., Arias, R.: Hölder continuous maps on the interval with positive metric mean dimension. Rev. Colomb. de Math. 57, 57–76 (2024)	spa
dcterms.bibliographicCitation	Acevedo, J.M.: Genericity of continuous maps with positive metric mean dimension. RM 77(1), 2 (2022)	spa
dcterms.bibliographicCitation	Acevedo, J.M., Baraviera, A., Becker, A.J., Scopel É.: Metric mean dimension and mean Hausdorff dimension varying the metric. (2024)	spa
dcterms.bibliographicCitation	Artin M., Mazur B.: On periodic points. Ann. Math. pp. 82-99 (1965)	spa
dcterms.bibliographicCitation	Carvalho, M., Rodrigues, F.B., Varandas, P.: Generic homeomorphisms have full metric mean dimension. Ergodic Theory Dynam. Syst. 42(1), 40–64 (2022)	spa
dcterms.bibliographicCitation	Gutman, Y., Tsukamoto, M.: Embedding minimal dynamical systems into Hilbert cubes. Invent. Math. 221(1), 113–166 (2020)	spa
dcterms.bibliographicCitation	Hurley, M.: On proofs of the general density theorem. Proceed. Amer. Math. Soci. 124(4), 1305–1309 (1996)	spa
dcterms.bibliographicCitation	Lindenstrauss, E., Weiss, B.: Mean topological dimension. Israel J. Math. 115(1), 1–24 (2000)	spa
dcterms.bibliographicCitation	Lindenstrauss, E., Tsukamoto, M.: Double variational principle for mean dimension. Geom. Funct. Anal. 29(4), 1048–1109 (2019)	spa
dcterms.bibliographicCitation	Lindenstrauss, E., Tsukamoto, M.: From rate distortion theory to metric mean dimension: variational principle. IEEE Trans. Inf. Theory 64(5), 3590–3609 (2018)	spa
dcterms.bibliographicCitation	Lindenstrauss, E., Tsukamoto, M.: Mean dimension and an embedding problem: an example. Israel J. Math. 199(2), 573–584 (2014)	spa
dcterms.bibliographicCitation	Shinoda, M., Tsukamoto, M.: Symbolic dynamics in mean dimension theory. Ergodic Theory Dynam. Syst. 41(8), 2542–2560 (2021)	spa
dcterms.bibliographicCitation	Tsukamoto, M.: Mean dimension of full shifts. Israel J. Math. 230, 183–193 (2019)	spa
dcterms.bibliographicCitation	Velozo A., Velozo R.: Rate distortion theory, metric mean dimension and measure theoretic entropy. arXiv preprint arXiv:1707.05762 (2017)	spa
dcterms.bibliographicCitation	Yano, K.: A remark on the topological entropy of homeomorphisms. Invent. Math. 59(3), 215–220 (1980)	spa
datacite.rights	http://purl.org/coar/access_right/c_abf2	spa
oaire.version	http://purl.org/coar/version/c_b1a7d7d4d402bcce	spa
dc.type.driver	info:eu-repo/semantics/article	spa
dc.type.hasversion	info:eu-repo/semantics/draft	spa
dc.identifier.doi	https://doi.org/10.1007/s10884-023-10344-5
dc.subject.keywords	Mean dimension	spa
dc.subject.keywords	Metric mean dimension	spa
dc.subject.keywords	Topological entropy	spa
dc.subject.keywords	Genericity	spa
dc.rights.accessrights	info:eu-repo/semantics/openAccess	spa
dc.rights.cc	CC0 1.0 Universal	*
dc.identifier.instname	Universidad Tecnológica de Bolívar	spa
dc.identifier.reponame	Repositorio Universidad Tecnológica de Bolívar	spa
dc.publisher.place	Cartagena de Indias	spa
dc.subject.armarc	LEMB
dc.type.spa	http://purl.org/coar/resource_type/c_6501	spa
dc.audience	Público general	spa
dc.publisher.sede	Campus Tecnológico	spa
oaire.resourcetype	http://purl.org/coar/resource_type/c_2df8fbb1	spa

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