On weak convergence of stochastic wave equation with colored noise on R

Abstract

In this paper, we study the following stochastic wave equation on the real line ∂t2 uα=∂x2 uα+b(uα)+σ(uα)ηα. The noise ηα is white in time and colored in space with a covariance structure E[ηα(t,x)ηα(s,y)]=δ(t-s)fα(x-y) where fα is continuous with respect to α in Fourier mode, see Assumption 1.2. We prove the continuity of the probability measure induced by the solution uα, in terms of α, with respect to the convergence in law in the topology of continuous functions with uniform metric on compact sets. We also give several examples of fα such that our theorem applies to.