In this work, we consider i.i.d. random perturbations of contracting Lorenz maps sufficiently close to a Rovella parameter. We prove that the quenched correlations of the random dynamical system decay exponentially
We prove exponential decay of correlations for a class of C1+αC1+α uniformly hyperbolic skew product...
This thesis is a study of the renormalization operator on Lorenz αmaps with a critical point. Lorenz...
International audienceThis paper is a first step in the study of the recurrence behavior in random d...
In this thesis, I examine the long-term statistical behaviour of particular random one-dimensional d...
In this article we study random tower maps driven by an ergodic automorphism. We prove quenched expo...
We study random towers that are suitable to analyse the statistics of slowly mixing random systems. ...
We study a class of random transformations built over finitely many intermittent maps sharing a comm...
In this paper we prove that the Poincar\'e map associated to a Lorenz like flow has exponential deca...
International audienceWe present a mostly numerical investigation on randomly perturbed piecewise co...
In this paper we prove that a class of skew products maps with non uniformly hyperbolic base has exp...
We introduce random towers to study almost sure rates of correlation decay for random partially hype...
The long time behavior of the random map xn → xn+1 = |xn-θn| is studied under various assumptions on...
In this work we study mixing properties of discrete dynamical systems and related to them geometric...
We introduce the notion of mean stability in i.i.d. random (holomorphic) 2-dimensional dynamical sys...
We start by analysing the effect of random perturbations on non-hyperbolic scattering dynamics. We ...
We prove exponential decay of correlations for a class of C1+αC1+α uniformly hyperbolic skew product...
This thesis is a study of the renormalization operator on Lorenz αmaps with a critical point. Lorenz...
International audienceThis paper is a first step in the study of the recurrence behavior in random d...
In this thesis, I examine the long-term statistical behaviour of particular random one-dimensional d...
In this article we study random tower maps driven by an ergodic automorphism. We prove quenched expo...
We study random towers that are suitable to analyse the statistics of slowly mixing random systems. ...
We study a class of random transformations built over finitely many intermittent maps sharing a comm...
In this paper we prove that the Poincar\'e map associated to a Lorenz like flow has exponential deca...
International audienceWe present a mostly numerical investigation on randomly perturbed piecewise co...
In this paper we prove that a class of skew products maps with non uniformly hyperbolic base has exp...
We introduce random towers to study almost sure rates of correlation decay for random partially hype...
The long time behavior of the random map xn → xn+1 = |xn-θn| is studied under various assumptions on...
In this work we study mixing properties of discrete dynamical systems and related to them geometric...
We introduce the notion of mean stability in i.i.d. random (holomorphic) 2-dimensional dynamical sys...
We start by analysing the effect of random perturbations on non-hyperbolic scattering dynamics. We ...
We prove exponential decay of correlations for a class of C1+αC1+α uniformly hyperbolic skew product...
This thesis is a study of the renormalization operator on Lorenz αmaps with a critical point. Lorenz...
International audienceThis paper is a first step in the study of the recurrence behavior in random d...