AbstractWe consider a jumping Markov process {Xtx}t≥0. We study the absolute continuity of the law of Xtx for t>0. We first consider, as Bichteler and Jacod [K. Bichteler, J. Jacod, Calcul de Malliavin pour les diffusions avec sauts, existence d’une densité dans le cas unidimensionel, in: Séminaire de Probabilités XVII, in: L.N.M., vol. 986, Springer, 1983, pp. 132–157] did, the case where the rate of jumping is constant. We state some results in the spirit of those of [K. Bichteler, J. Jacod, Calcul de Malliavin pour les diffusions avec sauts, existence d’une densité dans le cas unidimensionel, in: Séminaire de Probabilités XVII, in: L.N.M., vol. 986, Springer, 1983, pp. 132–157], with rather weaker assumptions and simpler proofs, not rely...
Abstract. The existence of density of process, which is given by canonical stochastic differential e...
In order to study the regularity of the density of a solution of a infinite activity jump driven sto...
This monograph presents a modern treatment of (1) stochastic differential equations and (2) diffusio...
We consider a jumping Markov process . We study the absolute continuity of the law of for t>0. We fi...
18 pagesInternational audienceWe consider a jumping Markov process X(t). We study the absolute conti...
AbstractWe consider a jumping Markov process {Xtx}t≥0. We study the absolute continuity of the law o...
We consider a jumping Markov process {Xxt}t≥0. We study the absolute continuity of the law of X x t ...
Abstract. We consider a Lévy process Xt and the solution Yt of a stochastic differential equation d...
We consider a one-dimensional jumping Markov process {Xxt}t≥0, solv-ing a Poisson-driven stochastic ...
We consider stochastic diffusion processes subject to jumps that occur at random times. We assume t...
International audienceWe consider a one-dimensional jumping Markov process {X-t(x)}(t >= 0), solving...
AbstractWe consider a process Yt which is the solution of a stochastic differential equation driven ...
We consider a process Yt which is the solution of a stochastic dif-ferential equation driven by a Le...
We study the solution X={Xt}t[set membership, variant][0,T] to a Poisson-driven SDE. This equation i...
We consider a real-valued diffusion process with a linear jump term driven by a Poisson point proces...
Abstract. The existence of density of process, which is given by canonical stochastic differential e...
In order to study the regularity of the density of a solution of a infinite activity jump driven sto...
This monograph presents a modern treatment of (1) stochastic differential equations and (2) diffusio...
We consider a jumping Markov process . We study the absolute continuity of the law of for t>0. We fi...
18 pagesInternational audienceWe consider a jumping Markov process X(t). We study the absolute conti...
AbstractWe consider a jumping Markov process {Xtx}t≥0. We study the absolute continuity of the law o...
We consider a jumping Markov process {Xxt}t≥0. We study the absolute continuity of the law of X x t ...
Abstract. We consider a Lévy process Xt and the solution Yt of a stochastic differential equation d...
We consider a one-dimensional jumping Markov process {Xxt}t≥0, solv-ing a Poisson-driven stochastic ...
We consider stochastic diffusion processes subject to jumps that occur at random times. We assume t...
International audienceWe consider a one-dimensional jumping Markov process {X-t(x)}(t >= 0), solving...
AbstractWe consider a process Yt which is the solution of a stochastic differential equation driven ...
We consider a process Yt which is the solution of a stochastic dif-ferential equation driven by a Le...
We study the solution X={Xt}t[set membership, variant][0,T] to a Poisson-driven SDE. This equation i...
We consider a real-valued diffusion process with a linear jump term driven by a Poisson point proces...
Abstract. The existence of density of process, which is given by canonical stochastic differential e...
In order to study the regularity of the density of a solution of a infinite activity jump driven sto...
This monograph presents a modern treatment of (1) stochastic differential equations and (2) diffusio...