On the chaotic character of the stochastic heat equation, II

Abstract

Consider the stochastic heat equation ∂t u = (2) u+σ(u)F, where the solution u:=ut(x) is indexed by (t,x)∈ (0, ∞)×d, and F is a centered Gaussian noise that is white in time and has spatially-correlated coordinates. We analyze the large-|x| fixed-t behavior of the solution u in different regimes, thereby study the effect of noise on the solution in various cases. Among other things, we show that if the spatial correlation function f of the noise is of Riesz type, that is f(x) \|x\|-α, then the "fluctuation exponents" of the solution are for the spatial variable and 2-1 for the time variable, where :=2/(4-α). Moreover, these exponent relations hold as long as α∈(0, d 2); that is precisely when Dalang's theory implies the existence of a solution to our stochastic PDE. These findings bolster earlier physical predictions.