AbstractI considered if solutions of stochastic differential equations have their density or not when the coefficients are not Lipschitz continuous. However, when stochastic differential equations whose coefficients are not Lipschitz continuous, the solutions would not belong to Sobolev space in general. So, I prepared the class Vh which is larger than Sobolev space, and considered the relation between absolute continuity of random variables and the class Vh. The relation is associated to a theorem of N. Bouleau and F. Hirsch. Moreover, I got a sufficient condition for a solution of stochastic differential equation to belong to the class Vh, and showed that solutions of stochastic differential equations have their densities in a special cas...
A new proof of existence of weak solutions to stochastic differential equations with continuous coef...
In this paper, we will consider the existence of a strong solution for stochastic differential equat...
The systematic study of existence, uniqueness, and properties of solutions to stochastic differentia...
AbstractI considered if solutions of stochastic differential equations have their density or not whe...
We apply the Malliavin calculus to study several non-degeneracy conditions on the coefficients of a ...
AbstractWe study the existence and smoothness of densities of laws of solutions of a canonical stoch...
We study the existence and regularity of densities for the solution of a nonlinear heat diffusion wi...
In recent decades, as a result of mathematicians' endeavor to come up with more realistic models for...
International audienceWe give an account of results already obtained in the direction of regularity ...
AbstractWe consider a stochastic differential equation with anticipating initial value and drift, an...
In the present work we have gone a step forward towards integration by part of higher order Malliavi...
AbstractWe apply the Malliavin calculus to study several non-degeneracy conditions on the coefficien...
We study the existence and regularity of the density for the solution u(t,x) (with fixed t > 0 an...
International audienceA new proof of existence of weak solutions to stochastic differential equation...
Abstract. We consider a Lévy process Xt and the solution Yt of a stochastic differential equation d...
A new proof of existence of weak solutions to stochastic differential equations with continuous coef...
In this paper, we will consider the existence of a strong solution for stochastic differential equat...
The systematic study of existence, uniqueness, and properties of solutions to stochastic differentia...
AbstractI considered if solutions of stochastic differential equations have their density or not whe...
We apply the Malliavin calculus to study several non-degeneracy conditions on the coefficients of a ...
AbstractWe study the existence and smoothness of densities of laws of solutions of a canonical stoch...
We study the existence and regularity of densities for the solution of a nonlinear heat diffusion wi...
In recent decades, as a result of mathematicians' endeavor to come up with more realistic models for...
International audienceWe give an account of results already obtained in the direction of regularity ...
AbstractWe consider a stochastic differential equation with anticipating initial value and drift, an...
In the present work we have gone a step forward towards integration by part of higher order Malliavi...
AbstractWe apply the Malliavin calculus to study several non-degeneracy conditions on the coefficien...
We study the existence and regularity of the density for the solution u(t,x) (with fixed t > 0 an...
International audienceA new proof of existence of weak solutions to stochastic differential equation...
Abstract. We consider a Lévy process Xt and the solution Yt of a stochastic differential equation d...
A new proof of existence of weak solutions to stochastic differential equations with continuous coef...
In this paper, we will consider the existence of a strong solution for stochastic differential equat...
The systematic study of existence, uniqueness, and properties of solutions to stochastic differentia...