We show that superpolynomial decay of correlations (rapid mixing) is prevalent for a class of nonuniformly hyperbolic flows. These flows are the continuous time analogue of the class of nonuniformly hyperbolic maps for which Young proved exponential decay of correlations. The proof combines techniques of Dolgopyat and operator renewal theory. It follows from our results that planar periodic Lorentz flows with finite horizons and flows near homoclinic tangencies are typically rapid mixing.</p
I illustrate a unified approach to the study of the decay of correlations in hyperbolic dynamical sy...
We obtain results on large deviations for a large class of nonuniformly hyperbolic dynamical systems...
We introduce a family of area preserving generalized baker’s transformations acting on the unit squ...
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...
We show that polynomial decay of correlations is prevalent for a class of nonuniformly hyperbolic fl...
We prove exponential decay of correlations for a class of C1+αC1+α uniformly hyperbolic skew product...
Abstract. We obtain general results on the stability of mixing and rapid mixing (su-perpolynomial de...
In this work we obtain mixing (and in some cases sharp mixing rates) for a reasonable large class ...
We prove exponential decay of correlations for a realistic model of piecewise hyperbolic flows prese...
Abstract. We prove that for evolution problems with normally hyperbolic trapping in phase space, cor...
We consider maps preserving a foliation which is uniformly contracting and a one-dimensional associa...
International audienceWe prove that for evolution problems with normally hyperbolic trapping in phas...
Recent work of Dolgopyat shows that "typical" hyperbolic flows exhibit rapid decay of correlations. ...
We consider multimodal C-3 interval maps f satisfying a summability condition on the derivatives D-n...
I illustrate a unified approach to the study of the decay of correlations in hyperbolic dynamical sy...
We obtain results on large deviations for a large class of nonuniformly hyperbolic dynamical systems...
We introduce a family of area preserving generalized baker’s transformations acting on the unit squ...
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...
We show that polynomial decay of correlations is prevalent for a class of nonuniformly hyperbolic fl...
We prove exponential decay of correlations for a class of C1+αC1+α uniformly hyperbolic skew product...
Abstract. We obtain general results on the stability of mixing and rapid mixing (su-perpolynomial de...
In this work we obtain mixing (and in some cases sharp mixing rates) for a reasonable large class ...
We prove exponential decay of correlations for a realistic model of piecewise hyperbolic flows prese...
Abstract. We prove that for evolution problems with normally hyperbolic trapping in phase space, cor...
We consider maps preserving a foliation which is uniformly contracting and a one-dimensional associa...
International audienceWe prove that for evolution problems with normally hyperbolic trapping in phas...
Recent work of Dolgopyat shows that "typical" hyperbolic flows exhibit rapid decay of correlations. ...
We consider multimodal C-3 interval maps f satisfying a summability condition on the derivatives D-n...
I illustrate a unified approach to the study of the decay of correlations in hyperbolic dynamical sy...
We obtain results on large deviations for a large class of nonuniformly hyperbolic dynamical systems...
We introduce a family of area preserving generalized baker’s transformations acting on the unit squ...