Spatial stationarity, ergodicity and CLT for parabolic Anderson model with delta initial condition in dimension d≥ 1

Abstract

Suppose that \u(t\,, x)\t >0, x ∈Rd is the solution to a d-dimensional parabolic Anderson model with delta initial condition and driven by a Gaussian noise that is white in time and has a spatially homogeneous covariance given by a nonnegative-definite measure f which satisfies Dalang's condition. Let pt(x):=(2π t)-d/2\-\|x\|2/(2t)\ denote the standard Gaussian heat kernel on Rd. We prove that for all t>0, the process U(t):=\u(t\,, x)/pt(x): x∈ Rd\ is stationary using Feynman-Kac's formula, and is ergodic under the additional condition f\0\=0, where f is the Fourier transform of f. Moreover, using Malliavin-Stein method, we investigate various central limit theorems for U(t) based on the quantitative analysis of f. In particular, when f is given by Riesz kernel, i.e., f(d x) = \|x\|-βd x, we obtain a multiple phase transition for the CLT for U(t) from β∈(0\,,1) to β=1 to β∈(1\,,d 2).