Scaling exponent for the Hopf-Cole solution of KPZ/Stochastic Burgers

Abstract

We consider the stochastic heat equation ∂tZ= ∂x2 Z - Z W on the real line, where W is space-time white noise. h(t,x)=- Z(t,x) is interpreted as a solution of the KPZ equation, and u(t,x)=∂x h(t,x) as a solution of the stochastic Burgers equation. We take Z(0,x)=\B(x)\ where B(x) is a two-sided Brownian motion, corresponding to the stationary solution of the stochastic Burgers equation. We show that there exist 0< c1 c2 <∞ such that c1t2/3 ( Z(t,x)) c2 t2/3. Analogous results are obtained for some moments of the correlation functions of u(t,x). In particular, it is shown that the excess diffusivity satisfies c1t1/3 D(t) c2 t1/3. The proof uses approximation by weakly asymmetric simple exclusion processes, for which we obtain the microscopic analogies of the results by coupling.