International audienceConsider on a manifold the solution $X$ of a stochastic differential equation driven by a Lévy process without Brownian part. Sufficient conditions for the smoothness of the law of $X_t$ are given, with particular emphasis on noncompact manifolds. The result is deduced from the case of affine spaces by means of a localisation technique. The particular cases of Lie groups and homogeneous spaces are discussed
The purpose of this note is to prove that the flatness of an invariant manifold for a semilinear sto...
AbstractIntrinsic stochastic calculus on manifolds for processes with jumps is used to prove global ...
AbstractWe derive an upper bound on the large-time exponential behavior of the solution to a stochas...
Abstract. We consider a Lévy process Xt and the solution Yt of a stochastic differential equation d...
We define a Lévy process on a smooth manifold M with a connection as a projection of a solution of a...
AbstractWe consider a non-local operator L associated to a Markov process with jumps, we stop this p...
International audienceWe consider a one-dimensional jumping Markov process {X-t(x)}(t >= 0), solving...
We consider a one-dimensional jumping Markov process {Xxt}t≥0, solv-ing a Poisson-driven stochastic ...
AbstractLet X be the solution of an Itô differential equation with jumps over Rd. Under some auxilia...
AbstractWe apply the Malliavin calculus to study several non-degeneracy conditions on the coefficien...
In this report we study Markov processes on compact and connected Riemannian manifolds. We define a ...
peer reviewedIn this paper, we prove, using Malliavin calculus, that under a global Hormander condi...
AbstractWe consider a jumping Markov process {Xtx}t≥0. We study the absolute continuity of the law o...
AbstractWe show that a Markov process in a manifold invariant under the action of a compact Lie grou...
AbstractWe study the existence and smoothness of densities of laws of solutions of a canonical stoch...
The purpose of this note is to prove that the flatness of an invariant manifold for a semilinear sto...
AbstractIntrinsic stochastic calculus on manifolds for processes with jumps is used to prove global ...
AbstractWe derive an upper bound on the large-time exponential behavior of the solution to a stochas...
Abstract. We consider a Lévy process Xt and the solution Yt of a stochastic differential equation d...
We define a Lévy process on a smooth manifold M with a connection as a projection of a solution of a...
AbstractWe consider a non-local operator L associated to a Markov process with jumps, we stop this p...
International audienceWe consider a one-dimensional jumping Markov process {X-t(x)}(t >= 0), solving...
We consider a one-dimensional jumping Markov process {Xxt}t≥0, solv-ing a Poisson-driven stochastic ...
AbstractLet X be the solution of an Itô differential equation with jumps over Rd. Under some auxilia...
AbstractWe apply the Malliavin calculus to study several non-degeneracy conditions on the coefficien...
In this report we study Markov processes on compact and connected Riemannian manifolds. We define a ...
peer reviewedIn this paper, we prove, using Malliavin calculus, that under a global Hormander condi...
AbstractWe consider a jumping Markov process {Xtx}t≥0. We study the absolute continuity of the law o...
AbstractWe show that a Markov process in a manifold invariant under the action of a compact Lie grou...
AbstractWe study the existence and smoothness of densities of laws of solutions of a canonical stoch...
The purpose of this note is to prove that the flatness of an invariant manifold for a semilinear sto...
AbstractIntrinsic stochastic calculus on manifolds for processes with jumps is used to prove global ...
AbstractWe derive an upper bound on the large-time exponential behavior of the solution to a stochas...