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Article Dans Une Revue Inventiones Mathematicae Année : 2018

On the ergodic theory of free group actions by real-analytic circle diffeomorphisms

Résumé

We consider finitely generated groups of real-analytic circle diffeomorphisms. We show that if such a group admits an exceptional minimal set (i.e., a minimal invariant Cantor set), then its Lebesgue measure is zero; moreover, there are only finitely many orbits of connected components of its complement. For the case of minimal actions, we show that if the underlying group is (algebraically) free, then the action is ergodic with respect to the Lebesgue measure. This provides first answers to questions due to É. Ghys, G. Hector and D. Sullivan.

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Systèmes dynamiques [math.DS]

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

https://hal.science/hal-00954984

Soumis le : lundi 3 mars 2014-17:09:45

Dernière modification le : vendredi 26 avril 2024-13:39:19

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hal-00954984 , version 1 (03-03-2014)

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Bertrand Deroin, Victor A. Kleptsyn, Andrés Navas. On the ergodic theory of free group actions by real-analytic circle diffeomorphisms. Inventiones Mathematicae, 2018, 212 (3), pp.731-779. ⟨10.1007/s00222-017-0779-4⟩. ⟨hal-00954984⟩

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