Spatial ergodicity and central limit theorems for parabolic Anderson model with delta initial condition

Abstract

Let \u(t\,, x)\t >0, x ∈R denote the solution to the parabolic Anderson model with initial condition δ0 and driven by space-time white noise on R+×R, and let pt(x):= (2π t)-1/2\-x2/(2t)\ denote the standard Gaussian heat kernel on the line. We use a non-trivial adaptation of the methods in our companion papers CKNP,CKNPb in order to prove that the random field x u(t\,,x)/pt(x) is ergodic for every t >0. And we establish an associated quantitative central limit theorem following the approach based on the Malliavin-Stein method introduced in Huang, Nualart, and Viitasaari HNV2018.