On $ C^2$-stable effects of intermingled basins of attractors in classes of boundary-preserving maps - Université de Rennes Accéder directement au contenu
Article Dans Une Revue Transactions of the Moscow Mathematical Society Année : 2011

On $ C^2$-stable effects of intermingled basins of attractors in classes of boundary-preserving maps

Victor A. Kleptsyn
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Institut de Recherche Mathématique de Rennes
Petr S. Saltykov
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Department of Mathematics

Résumé

In the spaces of boundary-preserving maps of an annulus and a thickened torus, we construct open sets in which every map has intermingled basins of attraction, as predicted by I. Kan. Namely, the attraction basins of each of the boundary components are everywhere dense in the phase space for such maps. Moreover, the Hausdorff dimension of the set of points that are not attracted by either of the components proves to be less than the dimension of the phase space itself, which strengthens the result following from the argument due to Bonatti, Diaz, and Viana.

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Systèmes dynamiques [math.DS]

Marie-Annick Guillemer  : Connectez-vous pour contacter le contributeur

https://hal.science/hal-01149829

Soumis le : jeudi 7 mai 2015-16:36:59

Dernière modification le : mercredi 13 décembre 2023-10:14:07

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hal-01149829 , version 1 (07-05-2015)

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Victor A. Kleptsyn, Petr S. Saltykov. On $ C^2$-stable effects of intermingled basins of attractors in classes of boundary-preserving maps. Transactions of the Moscow Mathematical Society, 2011, 72, pp.193-217. ⟨10.1090/S0077-1554-2012-00196-4⟩. ⟨hal-01149829⟩

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