arXiv:2308.11163 Abstract | arXiv Analytics

arXiv:2308.11163 [math.DS]Abstract References Reviews Resources

S-limit shadowing and a global description of Li-Yorke type chaos

Published 2023-08-22Version 1

For any continuous self-map of a compact metric space, we extend a partition of each chain component with respect to a chain proximal relation to a $G_\delta$-partition of the phase space. Under the assumption of s-limit shadowing, we use this partition to give a global description of Li-Yorke type chaos corresponding to several Furstenberg families.

Comments: 18 pages

Categories: math.DS

Subjects: 37B05, 37B35, 37B65, 37D45

Keywords: global description, s-limit shadowing, compact metric space, chain proximal relation, furstenberg families

Related articles: Most relevant | Search more

arXiv:math/0608257 [math.DS] (Published 2006-08-10)

Every compact metric space that supports a positively expansive homeomorphism is finite

Ethan M. Coven, Michael Keane

arXiv:0910.1958 [math.DS] (Published 2009-10-10, updated 2011-11-07)

On μ-Compatible Metrics and Measurable Sensitivity

Ilya Grigoriev, Nathaniel Ince, Marius Catalin Iordan, Amos Lubin, Cesar E. Silva

arXiv:1605.07047 [math.DS] (Published 2016-05-23)