AbstractWe shall investigate on vector fields of low regularity on the Wiener space, with divergence having low exponential integrability. We prove that the vector field generates a flow of quasi-invariant measurable maps with density belonging to the space LlogL. An explicit expression for the density is also given
We establish the renormalization property for essentially bounded solutions of the continuity equati...
AbstractWe prove Meyer′s inequalities for functionals on the Wiener space that take values on a Bana...
International audienceWe prove quantitative estimates for flows of vector fields subject to anisotro...
AbstractWe shall investigate on vector fields of low regularity on the Wiener space, with divergence...
AbstractSobolev spaces for Banach space valued Wiener functionals are constructed using the operator...
AbstractWe consider a differential equation on the Wiener space. We show that the solutions for the ...
AbstractFor a geometrically and stochastically complete, noncompact Riemannian manifold, we show tha...
AbstractIn this paper we extend the DiPerna–Lions theory of flows associated to Sobolev vector field...
In this paper we provide the first extension of the DiPerna–Lions theory of flows associated to Sobo...
We prove the existence of the global flow fU t g generated by a vector field A from a Sobolev class ...
ABSTRACT. We prove a generalization of the Cameron-Martin theorem for a geometrically and stochastic...
AbstractWe prove, under certain regularity assumptions on the coefficients, that tangent processes (...
AbstractWe prove the existence of the global flow {Ut} generated by a vector field A from a Sobolev ...
AbstractThe existence and uniqueness of a flow associated to an adapted vector field ξ on the Wiener...
AbstractIn Malliavin calculus, submanifolds in Wiener spaces have been studied by many people instea...
We establish the renormalization property for essentially bounded solutions of the continuity equati...
AbstractWe prove Meyer′s inequalities for functionals on the Wiener space that take values on a Bana...
International audienceWe prove quantitative estimates for flows of vector fields subject to anisotro...
AbstractWe shall investigate on vector fields of low regularity on the Wiener space, with divergence...
AbstractSobolev spaces for Banach space valued Wiener functionals are constructed using the operator...
AbstractWe consider a differential equation on the Wiener space. We show that the solutions for the ...
AbstractFor a geometrically and stochastically complete, noncompact Riemannian manifold, we show tha...
AbstractIn this paper we extend the DiPerna–Lions theory of flows associated to Sobolev vector field...
In this paper we provide the first extension of the DiPerna–Lions theory of flows associated to Sobo...
We prove the existence of the global flow fU t g generated by a vector field A from a Sobolev class ...
ABSTRACT. We prove a generalization of the Cameron-Martin theorem for a geometrically and stochastic...
AbstractWe prove, under certain regularity assumptions on the coefficients, that tangent processes (...
AbstractWe prove the existence of the global flow {Ut} generated by a vector field A from a Sobolev ...
AbstractThe existence and uniqueness of a flow associated to an adapted vector field ξ on the Wiener...
AbstractIn Malliavin calculus, submanifolds in Wiener spaces have been studied by many people instea...
We establish the renormalization property for essentially bounded solutions of the continuity equati...
AbstractWe prove Meyer′s inequalities for functionals on the Wiener space that take values on a Bana...
International audienceWe prove quantitative estimates for flows of vector fields subject to anisotro...