Invariant measures for the nonlinear stochastic heat equation with no drift term

Abstract

This paper deals with the long term behavior of the solution to the nonlinear stochastic heat equation ∂ u /∂ t - 12 u = b(u)W, where b is assumed to be a globally Lipschitz continuous function and the noise W is a centered and spatially homogeneous Gaussian noise that is white in time. Using the moment formulas obtained in [9, 10], we identify a set of conditions on the initial data, the correlation measure and the weight function , which will together guarantee the existence of an invariant measure in the weighted space L2(Rd). In particular, our result includes the parabolic Anderson model (i.e., the case when b(u) = λ u) starting from the Dirac delta measure.