Striped structures of stable and unstable sets of expansive homeomorphisms and a theorem of K. Kuratowski on independent sets

Kato, Hisao

Kato, Hisao

Fundamenta Mathematicae, Tome 142 (1993), p. 153-165 / Harvested from The Polish Digital Mathematics Library

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Résumé

We investigate striped structures of stable and unstable sets of expansive homeomorphisms and continuum-wise expansive homeomorphisms. The following theorem is proved: if f : X → X is an expansive homeomorphism of a compact metric space X with dim X > 0, then the decompositions $W^{S} (x) | x \in X$ and $W^{(} u) (x) | x \in X$ of X into stable and unstable sets of f respectively are uncountable, and moreover there is σ (= s or u) and ϱ > 0 such that there is a Cantor set C in X with the property that for each x ∈ C, $W^{σ} (x)$ contains a nondegenerate subcontinuum $A_{x}$ containing x with $d i a m A_{x} \geq ϱ$ , and if x,y ∈ C and x ≠ y, then $W^{σ} (x) \neq W^{σ} (y)$ . For a continuum-wise expansive homeomorphism, a similar result is obtained. Also, we prove that if f : G → G is a map of a graph G and the shift map ˜f: (G,f) → (G,f) of f is expansive, then for each ˜x ∈ (G,f), $W^{u} (˜ x)$ is equal to the arc component of (G,f) containing ˜x, and $d i m W^{s} (W^{x}) = 0$ .

Publié le : 1993-01-01

Zbl 0790.54053

EUDML-ID : urn:eudml:doc:211998

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     author = {Hisao Kato},
     title = {Striped structures of stable and unstable sets of expansive homeomorphisms and a theorem of K. Kuratowski on independent sets},
     journal = {Fundamenta Mathematicae},
     volume = {142},
     year = {1993},
     pages = {153-165},
     zbl = {0790.54053},
     language = {en},
     url = {http://dml.mathdoc.fr/item/bwmeta1.element.bwnjournal-article-fmv143i2p153bwm}
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Kato, Hisao. Striped structures of stable and unstable sets of expansive homeomorphisms and a theorem of K. Kuratowski on independent sets. Fundamenta Mathematicae, Tome 142 (1993) pp. 153-165. http://gdmltest.u-ga.fr/item/bwmeta1.element.bwnjournal-article-fmv143i2p153bwm/

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