2021
DOI: 10.48550/arxiv.2111.06055
|View full text |Cite
Preprint
|
Sign up to set email alerts
|

Strongly distributional chaos of irregular orbits that are not uniformly hyperbolic

Abstract: In this article we prove that for a diffeomorphism on a compact Riemannian manifold, if there is a nontrival homoclinic class that is not uniformly hyperbolic or the diffeomorphism is a C 1+α and there is a hyperbolic ergodic measure whose support is not uniformly hyperbolic, then we find a type of strongly distributional chaos which is stronger than usual distributional chaos and Li-Yorke chaos in the set of irregular orbits that are not uniformly hyperbolic. Meanwhile, we prove that various fractal sets are … Show more

Help me understand this report

Search citation statements

Order By: Relevance

Paper Sections

Select...
2
1
1

Citation Types

0
8
0

Year Published

2021
2021
2023
2023

Publication Types

Select...
2
1

Relationship

2
1

Authors

Journals

citations
Cited by 3 publications
(8 citation statements)
references
References 51 publications
0
8
0
Order By: Relevance
“…And in the present paper, for possibly more applications we give an abstract general mechanism to study irregular points provided that the system has a sequence of nondecreasing invariant compact subsets such that every subsystem has shadowing property and is transitive. In our previous paper [20], we proved that the irregular points that are not uniformly hyperbolic are strongly distributional chaos. In this paper, we will prove that the irregular points that are not uniformly hyperbolic have strong dynamical complexity in the sense of topological entropy.…”
Section: Introductionmentioning
confidence: 91%
See 1 more Smart Citation
“…And in the present paper, for possibly more applications we give an abstract general mechanism to study irregular points provided that the system has a sequence of nondecreasing invariant compact subsets such that every subsystem has shadowing property and is transitive. In our previous paper [20], we proved that the irregular points that are not uniformly hyperbolic are strongly distributional chaos. In this paper, we will prove that the irregular points that are not uniformly hyperbolic have strong dynamical complexity in the sense of topological entropy.…”
Section: Introductionmentioning
confidence: 91%
“…[20, Proposition 4.9] Suppose that (X, f ) is a dynamical system. Let Y ⊆ X be a non-empty compact f -invariant set.…”
mentioning
confidence: 99%
“…Readers can refer to [17,55,58] for the definition of DC2 and DC3 if necessary. Now we recall from [27] a kind of chaos, strongly distributional chaos, which is stronger than usual distributional chaos and Li-Yorke chaos. For any positive integer n, points x, y ∈ M and…”
Section: Distributional Chaos and Strongly Distributional Chaosmentioning
confidence: 99%
“…For every β 1 > 1, there exists 1 < β 2 < β 1 such that and (Σ β 2 , σ) satisfies the shadowing property. By [27,Proposition 6.4] every subshift with shadowing property satisfies exponential shadowing property. So (Σ β 2 , σ) has exponential shadowing property.…”
Section: Proof Of Main Theoremsmentioning
confidence: 99%
“…This framework is applicable to uniformly hyperbolic systems, but it is not applicable to general homoclinic classes and diffeomorphisms preserving hyperbolic ergodic measures. Recently, a new framework in [13,14] developed to study dynamical complexity of saturated set of such systems enables us to consider dynamical complexity of E α . Also, Strongly distributional chaos (definition 2.10) was introduced in [13], it is stronger than distributional chaos of type 1 ([13, proposition 2.5]).…”
Section: Introductionmentioning
confidence: 99%