On Limiting Behavior of Stationary Measures for Stochastic Evolution Systems with Small Noise Intensity

Abstract

The limiting behavior of stochastic evolution processes with small noise intensity ε is investigated in distribution-based approach. Let με be stationary measure for stochastic process Xε with small ε and X0 be a semiflow on a Polish space. Assume that \με: 0<ε≤ε0\ is tight. Then all their limits in weak sense are X0-invariant and their supports are contained in Birkhoff center of X0. Applications are made to various stochastic evolution systems, including stochastic ordinary differential equations, stochastic partial differential equations, stochastic functional differential equations driven by Brownian motion or L\'evy process.