• 제목/요약/키워드: expansive homeomorphism

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SYMBOLICALLY EXPANSIVE DYNAMICAL SYSTEMS

  • Oh, Jumi
    • 충청수학회지
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    • 제35권1호
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    • pp.85-90
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    • 2022
  • In this article, we consider the notion of expansiveness on compact metric spaces for symbolically point of view. And we show that a homeomorphism is symbolically countably expansive if and only if it is symbolically measure expansive. Moreover, we prove that a homeomorphism is symbolically N-expansive if and only if it is symbolically measure N-expanding.

THE PSEUDO ORBIT TRACING PROPERTY AND EXPANSIVENESS ON UNIFORM SPACES

  • Lee, Kyung Bok
    • 충청수학회지
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    • 제35권3호
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    • pp.255-267
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    • 2022
  • Uniform space is a generalization of metric space. The main purpose of this paper is to extend several results contained in [5, 6] which have for an expansive homeomorphism with the pseudo orbit tracing property(POTP in short) on a compact metric space (X, d) for an expansive homeomorphism with the POTP on a compact uniform space (X, 𝒰). we characterize stable and unstable sets, sink and source and saddle, recurrent points for an expansive homeomorphism which has the POTP on a compact uniform space (X, 𝒰).

ON THE COUNTABLE COMPACTA AND EXPANSIVE HOMEOMORPHISMS

  • Kim, In-Su;Kato, Hisao;Park, Jong-Jin
    • 대한수학회보
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    • 제36권2호
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    • pp.403-409
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    • 1999
  • In this paper we introduce the notions of expansive homeomorphism and its properties, and study the relation between countable compacta and ordinal numbers. Our results extend and improve those of T.Kimura and others.

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ENTROPY MAPS FOR MEASURE EXPANSIVE HOMEOMORPHISM

  • JEONG, JAEHYUN;JUNG, WOOCHUL
    • 충청수학회지
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    • 제28권3호
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    • pp.377-384
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    • 2015
  • It is well known that the entropy map is upper semi-continuous for expansive homeomorphisms on a compact metric space. Recently, Morales [3] introduced the notion of measure expansiveness which is general than that of expansiveness. In this paper, we prove that the entropy map is upper semi-continuous for measure expansive homeomorphisms.

PERIODIC SHADOWABLE POINTS

  • Namjip Koo;Hyunhee Lee;Nyamdavaa Tsegmid
    • 대한수학회보
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    • 제61권1호
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    • pp.195-205
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    • 2024
  • In this paper, we consider the set of periodic shadowable points for homeomorphisms of a compact metric space, and we prove that this set satisfies some properties such as invariance and being a Gδ set. Then we investigate implication relations related to sets consisting of shadowable points, periodic shadowable points and uniformly expansive points, respectively. Assume that the set of periodic points and the set of periodic shadowable points of a homeomorphism on a compact metric space are dense in X. Then we show that a homeomorphism has the periodic shadowing property if and only if so is the restricted map to the set of periodic shadowable points. We also give some examples related to our results.

PRESERVATION OF EXPANSIVITY IN HYPERSPACE DYNAMICAL SYSTEMS

  • Koo, Namjip;Lee, Hyunhee
    • 대한수학회지
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    • 제58권6호
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    • pp.1421-1431
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    • 2021
  • In this paper we study the preservation of various notions of expansivity in discrete dynamical systems and the induced map for n-fold symmetric products and hyperspaces. Then we give a characterization of a compact metric space admitting hyper N-expansive homeomorphisms via the topological dimension. More precisely, we show that C0-generically, any homeomorphism on a compact manifold is not hyper N-expansive for any N ∈ ℕ. Also we give some examples to illustrate our results.

EXPANSIVE HOMEOMORPHISMS WITH THE SHADOWING PROPERTY ON ZERO DIMENSIONAL SPACES

  • Park, Jong-Jin
    • 대한수학회논문집
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    • 제19권4호
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    • pp.759-764
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    • 2004
  • Let X = {a} ${\cup}$ {$a_{i}$ ${$\mid$}$i $\in$ N} be a subspace of Euclidean space $E^2$ such that $lim_{{i}{\longrightarrow}{$\infty}}a_{i}$ = a and $a_{i}\;{\neq}\;a_{j}$ for $i{\neq}j$. Then it is well known that the space X has no expansive homeomorphisms with the shadowing property. In this paper we show that the set of all expansive homeomorphisms with the shadowing property on the space Y is dense in the space H(Y) of all homeomorphisms on Y, where Y = {a, b} ${\cup}$ {$a_{i}{$\mid$}i{\in}Z$} is a subspace of $E^2$ such that $lim_{i}$-$\infty$ $a_{i}$ = b and $lim_{{i}{\longrightarrow}{$\infty}}a_{i}$ = a with the following properties; $a_{i}{\neq}a_{j}$ for $i{\neq}j$ and $a{\neq}b$.