Add to ORKGWe formulate and prove a local stable manifold theorem for stochastic differential equations (SDEs) that are driven by spatial Kunita-type semimartingales with stationary ergodic increments. Both Stratonovich and Itô-type equations are treated. Starting with the existence of a stochastic flow for a SDE, we introduce the notion of a hyperbolic stationary trajectory. We prove the existence of invariant random stable and unstable manifolds in the neighborhood of the hyperbolic stationary solution. For Stratonovich SDEs, the stable and unstable manifolds are dynamically characterized using forward and backward solutions of the anticipating SDE. The proof of the stable manifold theorem is based on Ruelle–Oseledec multiplicative ergodic theory
In this paper we present a result on convergence of approximate solutions of stochastic differential...
summary:The Cauchy problem for a stochastic partial differential equation with a spatial correlated ...
This is a preliminary study of possible necessary and sufficient conditions to insure stationarity i...
AbstractWe state and prove a Local Stable Manifold Theorem (Theorem 4.1) for non-linear stochastic d...
In this talk, we formulate a local stable manifold theorem for stochastic differential equations in ...
We state and prove a Local Stable Manifold Theorem (Theorem 4.1) for non- linear stochastic differen...
This article is a sequel, aimed at completing the characterization of the pathwise local structure o...
For the stochastic partial differential equation $\frac{\partial u}{\partial t}=\mathcal L u +u\dot...
AbstractIn this paper, we study the dynamics of a two-dimensional stochastic Navier–Stokes equation ...
The main objective of this paper is to characterize the pathwise local structure of solutions of sem...
The main objective of this paper is to characterize the pathwise local structure of solutions of sem...
In this paper we prove a stochastic representation for solutions of the evolution equation ∂t ψt= ½L...
AbstractWe consider a stochastic differential equation (SDE) of jump type on a finite-dimensional co...
This thesis deals with the study of the stochastic continuity equation (SCE) on R^d under low regula...
The main objective of this work is to characterize the pathwise local structure of solutions of semi...
In this paper we present a result on convergence of approximate solutions of stochastic differential...
summary:The Cauchy problem for a stochastic partial differential equation with a spatial correlated ...
This is a preliminary study of possible necessary and sufficient conditions to insure stationarity i...
AbstractWe state and prove a Local Stable Manifold Theorem (Theorem 4.1) for non-linear stochastic d...
In this talk, we formulate a local stable manifold theorem for stochastic differential equations in ...
We state and prove a Local Stable Manifold Theorem (Theorem 4.1) for non- linear stochastic differen...
This article is a sequel, aimed at completing the characterization of the pathwise local structure o...
For the stochastic partial differential equation $\frac{\partial u}{\partial t}=\mathcal L u +u\dot...
AbstractIn this paper, we study the dynamics of a two-dimensional stochastic Navier–Stokes equation ...
The main objective of this paper is to characterize the pathwise local structure of solutions of sem...
The main objective of this paper is to characterize the pathwise local structure of solutions of sem...
In this paper we prove a stochastic representation for solutions of the evolution equation ∂t ψt= ½L...
AbstractWe consider a stochastic differential equation (SDE) of jump type on a finite-dimensional co...
This thesis deals with the study of the stochastic continuity equation (SCE) on R^d under low regula...
The main objective of this work is to characterize the pathwise local structure of solutions of semi...
In this paper we present a result on convergence of approximate solutions of stochastic differential...
summary:The Cauchy problem for a stochastic partial differential equation with a spatial correlated ...
This is a preliminary study of possible necessary and sufficient conditions to insure stationarity i...