Add to ORKGWe show that the ergodic averages for the horocycle flow on the two-torus associated by Giulietti and Liverani to an Anosov diffeomorphism either grow linearly or are bounded, in other words there are no deviations. For this, we use topological invariance of the Artin-Mazur zeta function to exclude resonances outside of the open unit disc. Transfer operators acting on suitable spaces of anisotropic distributions and their Ruelle determinants are the key tools in the proof. As a bonus, we show that for any smooth Anosov diffeomorphism F on the two-torus, the correlations for the measure of maximal entropy and smooth observables decay with a rate strictly smaller than exp(-h_top(F)). We compare our results with related work of Forni
We study Anosov diffeomorphisms on surfaces with small holes. The points that are mapped into the ho...
Abstract. We study the action of the horocycle flow on the mod-uli space of abelian differentials in...
International audiencePesin sets are measurable sets along which the behavior of a matrix cocycle ab...
We show that the ergodic averages for the horocycle flow on the two-torus associated by Giulietti an...
This paper now has two authors. The presentation has been thoroughly revised. Minor mistakes were fi...
Cette thèse de doctorat approfondit l'étude de la dynamique hyperbolique sur les variétés fermées et...
We investigate the relation between the distributions appearing in the study of ergodic averages of ...
We study the horocycle flow on the stratum of translation surfaces $\mathcal{H}(2)$, showing that th...
We study the horocycle flow on the stratum of abelian differentials H(2). We show that there is a se...
Abstract. We discuss the asymptotic distribution of the directions in homology of periodic orbits of...
International audienceWe continue our study of the dynamics of mappings with small topological degre...
Abstract. We give eective bounds on the deviation of ergodic aver-ages for the horocycle ow on the ...
Abstract. The paper deals with the billiard flow in the exterior of several strictly convex disjoint...
Let OE t be a topologically mixing Anosov flow on a 3-D compact manifolds M . Every unstable fiber...
This volume presents a general smooth ergodic theory for deterministic dynamical systems generated b...
We study Anosov diffeomorphisms on surfaces with small holes. The points that are mapped into the ho...
Abstract. We study the action of the horocycle flow on the mod-uli space of abelian differentials in...
International audiencePesin sets are measurable sets along which the behavior of a matrix cocycle ab...
We show that the ergodic averages for the horocycle flow on the two-torus associated by Giulietti an...
This paper now has two authors. The presentation has been thoroughly revised. Minor mistakes were fi...
Cette thèse de doctorat approfondit l'étude de la dynamique hyperbolique sur les variétés fermées et...
We investigate the relation between the distributions appearing in the study of ergodic averages of ...
We study the horocycle flow on the stratum of translation surfaces $\mathcal{H}(2)$, showing that th...
We study the horocycle flow on the stratum of abelian differentials H(2). We show that there is a se...
Abstract. We discuss the asymptotic distribution of the directions in homology of periodic orbits of...
International audienceWe continue our study of the dynamics of mappings with small topological degre...
Abstract. We give eective bounds on the deviation of ergodic aver-ages for the horocycle ow on the ...
Abstract. The paper deals with the billiard flow in the exterior of several strictly convex disjoint...
Let OE t be a topologically mixing Anosov flow on a 3-D compact manifolds M . Every unstable fiber...
This volume presents a general smooth ergodic theory for deterministic dynamical systems generated b...
We study Anosov diffeomorphisms on surfaces with small holes. The points that are mapped into the ho...
Abstract. We study the action of the horocycle flow on the mod-uli space of abelian differentials in...
International audiencePesin sets are measurable sets along which the behavior of a matrix cocycle ab...