International audienceWe give examples of quasi-hyperbolic dynamical systems with the following properties: polynomial decay of correlations, convergence in law toward a non-Gaussian law of the ergodic sums (divided by n(3/4)) associated to non-degenerated regular functions
Abstract. We prove that for evolution problems with normally hyperbolic trapping in phase space, cor...
We prove large deviation principles for ergodic averages of dynamical systems admitting Markov tower...
We prove large deviation principles for ergodic averages of dynamical systems admitting Markov tower...
I illustrate a unified approach to the study of the decay of correlations in hyperbolic dynamical sy...
We show that polynomial decay of correlations is prevalent for a class of nonuniformly hyperbolic fl...
We consider toral extensions of hyperbolic dynamical systems. We prove that its quantitative recurre...
This monograph offers a coherent, self-contained account of the theory of Sinai–Ruelle–Bowen measure...
Abstract. Almost hyperbolic systems are smooth dynamical systems that are hyperbolic everywhere exce...
We obtain results on large deviations for a large class of nonuniformly hyperbolic dynamical systems...
We show that superpolynomial decay of correlations (rapid mixing) is prevalent for a class of nonuni...
Abstract. We study an intermittent quasistatic dynamical system composed of nonuni-formly hyperbolic...
We show that superpolynomial decay of correlations (rapid mixing) is prevalent for a class of nonuni...
We show that superpolynomial decay of correlations (rapid mixing) is prevalent for a class of nonuni...
International audienceWe prove that for evolution problems with normally hyperbolic trapping in phas...
Classical dynamical systems involves the study of the long-time behavior of a fixed map or vector fi...
Abstract. We prove that for evolution problems with normally hyperbolic trapping in phase space, cor...
We prove large deviation principles for ergodic averages of dynamical systems admitting Markov tower...
We prove large deviation principles for ergodic averages of dynamical systems admitting Markov tower...
I illustrate a unified approach to the study of the decay of correlations in hyperbolic dynamical sy...
We show that polynomial decay of correlations is prevalent for a class of nonuniformly hyperbolic fl...
We consider toral extensions of hyperbolic dynamical systems. We prove that its quantitative recurre...
This monograph offers a coherent, self-contained account of the theory of Sinai–Ruelle–Bowen measure...
Abstract. Almost hyperbolic systems are smooth dynamical systems that are hyperbolic everywhere exce...
We obtain results on large deviations for a large class of nonuniformly hyperbolic dynamical systems...
We show that superpolynomial decay of correlations (rapid mixing) is prevalent for a class of nonuni...
Abstract. We study an intermittent quasistatic dynamical system composed of nonuni-formly hyperbolic...
We show that superpolynomial decay of correlations (rapid mixing) is prevalent for a class of nonuni...
We show that superpolynomial decay of correlations (rapid mixing) is prevalent for a class of nonuni...
International audienceWe prove that for evolution problems with normally hyperbolic trapping in phas...
Classical dynamical systems involves the study of the long-time behavior of a fixed map or vector fi...
Abstract. We prove that for evolution problems with normally hyperbolic trapping in phase space, cor...
We prove large deviation principles for ergodic averages of dynamical systems admitting Markov tower...
We prove large deviation principles for ergodic averages of dynamical systems admitting Markov tower...
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