We describe an approach to the dynamics of non-linear stochastic differential systems with finite memory using multiplicative cocycles in Hilbert space. We introduce the notion of hyperbolicity for stationary solutions of stochastic systems with memory. We then establish the existence of smooth stable and unstable manifolds in a neighborhood of a hyperbolic stationary solution. The stable and unstable manifolds are stationary and asymptotically invariant under the stochastic semiflow. The proof uses ideas from infinite-dimensional multiplicative ergodic theory and interpolation arguments
Random dynamical systems are generated by recursively applied sequences of maps, where the choice o...
In this paper, we study perturbations of the $d$-dimensional Ising model for $d\geq 2$, including lo...
2012-2013 > Academic research: refereed > Publication in refereed journalVersion of RecordPublishe
In this talk, we formulate a local stable manifold theorem for stochastic differential equations in ...
I gave the following two talks at the Stochastic Analysis Seminar at the Mathematical Sciences Resea...
We outline proofs of two stable-manifold theorems for stochastic differential systems with and witho...
We prove an existence theorem for solutions of stochastic functional differential equations under sm...
AbstractWe answer a problem of Liao [S.T. Liao, Standard systems of differential equations and obstr...
In this paper we study a nonlinear evolution inclusion of subdifferential type in Hilbert spaces. T...
AbstractA system-theoretic framework is proposed, which allows the study of hybrid uncertain systems...
We consider a class of parabolic free boundary problems with heterogeneous coefficients including, f...
In this paper, we consider a robust version of multiple-set linear canonical analysis obtained by us...
AbstractIn the present paper the oscillatory properties of the solutions of parabolic equations with...
AbstractThis paper is concerned with the nonoscillatory problems of odd-dimensional systems of linea...
The 2D Euler equations with random initial condition has been investigates by Albeverio and Cruzeiro...
Random dynamical systems are generated by recursively applied sequences of maps, where the choice o...
In this paper, we study perturbations of the $d$-dimensional Ising model for $d\geq 2$, including lo...
2012-2013 > Academic research: refereed > Publication in refereed journalVersion of RecordPublishe
In this talk, we formulate a local stable manifold theorem for stochastic differential equations in ...
I gave the following two talks at the Stochastic Analysis Seminar at the Mathematical Sciences Resea...
We outline proofs of two stable-manifold theorems for stochastic differential systems with and witho...
We prove an existence theorem for solutions of stochastic functional differential equations under sm...
AbstractWe answer a problem of Liao [S.T. Liao, Standard systems of differential equations and obstr...
In this paper we study a nonlinear evolution inclusion of subdifferential type in Hilbert spaces. T...
AbstractA system-theoretic framework is proposed, which allows the study of hybrid uncertain systems...
We consider a class of parabolic free boundary problems with heterogeneous coefficients including, f...
In this paper, we consider a robust version of multiple-set linear canonical analysis obtained by us...
AbstractIn the present paper the oscillatory properties of the solutions of parabolic equations with...
AbstractThis paper is concerned with the nonoscillatory problems of odd-dimensional systems of linea...
The 2D Euler equations with random initial condition has been investigates by Albeverio and Cruzeiro...
Random dynamical systems are generated by recursively applied sequences of maps, where the choice o...
In this paper, we study perturbations of the $d$-dimensional Ising model for $d\geq 2$, including lo...
2012-2013 > Academic research: refereed > Publication in refereed journalVersion of RecordPublishe