An invariance principle for stochastic heat equations with periodic coefficients

Abstract

We investigate the asymptotic behaviors of the solution u(t, ·) to a stochastic heat equation with a periodic, gradient-type nonlinear term. We extend the central limit theorem for finite-dimensional diffusions to infinite-dimensional settings. Due to our results, 1 tu(t, ·) converges weakly to a centered Gaussian variable whose covariance operator is described through Poisson equations. Different from the finite-dimensional case, the fluctuation in space vanishes in the limit distribution. Furthermore, we verify the tightness and present an invariance principle for \ε u(ε-2t, ·)\t ∈ [0, T] as ε 0.