Under certain conditions a many-to-one transformation of the unit interval into itself possesses a finite invariant ergodic measure equivalent to the Lebesque measure. The purpose of this thesis is to investigate these conditions and to show how differentiable properties of the invariant density are inherited from the original transformation
International audienceWe continue our study of the dynamics of mappings with small topological degre...
This volume presents a general smooth ergodic theory for deterministic dynamical systems generated b...
Abstract. We use an Ulam-type discretization scheme to provide pointwise approximations for invarian...
Abstract. In this paper we study a class of measures, called harmonic mea-sures, that one can associ...
Abstract. An important approach to establishing stochastic be-havior of dynamical systems is based o...
We studied invariant measures and invariant densities for dynamical systems with random switching (s...
This paper is concerned with giving explicitly the invariant density for a class of rational transfo...
We introduce the concept of ergodicity space of a measure-preserving transformation and will present...
AbstractWe consider the invariant measure for finite systems of interacting branching diffusions wit...
This book studies ergodic-theoretic aspects of random dynam- ical systems, i.e. of deterministic sys...
The proof of the invariant gibbs measure existence for hyperbolic mappings with singularities is the...
Dynamical systems are considered dissipative when they asymptotically produce a net contraction of v...
AbstractIn this paper we present some functional analytic tools that allow us to prove a theorem on ...
Let X be a projective manifold and f : X ¿¿ X a rational mapping with large topological degree, dt >...
Abstract. We study the Hausdorff dimension and the pointwise di-mension of measures that are not nec...
International audienceWe continue our study of the dynamics of mappings with small topological degre...
This volume presents a general smooth ergodic theory for deterministic dynamical systems generated b...
Abstract. We use an Ulam-type discretization scheme to provide pointwise approximations for invarian...
Abstract. In this paper we study a class of measures, called harmonic mea-sures, that one can associ...
Abstract. An important approach to establishing stochastic be-havior of dynamical systems is based o...
We studied invariant measures and invariant densities for dynamical systems with random switching (s...
This paper is concerned with giving explicitly the invariant density for a class of rational transfo...
We introduce the concept of ergodicity space of a measure-preserving transformation and will present...
AbstractWe consider the invariant measure for finite systems of interacting branching diffusions wit...
This book studies ergodic-theoretic aspects of random dynam- ical systems, i.e. of deterministic sys...
The proof of the invariant gibbs measure existence for hyperbolic mappings with singularities is the...
Dynamical systems are considered dissipative when they asymptotically produce a net contraction of v...
AbstractIn this paper we present some functional analytic tools that allow us to prove a theorem on ...
Let X be a projective manifold and f : X ¿¿ X a rational mapping with large topological degree, dt >...
Abstract. We study the Hausdorff dimension and the pointwise di-mension of measures that are not nec...
International audienceWe continue our study of the dynamics of mappings with small topological degre...
This volume presents a general smooth ergodic theory for deterministic dynamical systems generated b...
Abstract. We use an Ulam-type discretization scheme to provide pointwise approximations for invarian...