Front fluctuations for the stochastic Cahn-Hilliard equation

Abstract

We consider the Cahn-Hilliard equation in one space dimension, perturbed by the derivative of a space and time white noise of intensity ε 12, and we investigate the effect of the noise, as ε 0, on the solutions when the initial condition is a front that separates the two stable phases. We prove that, given γ< 23, with probability going to one as ε 0, the solution remains close to a front for times of the order of ε-γ, and we study the fluctuations of the front in this time scaling. They are given by a one dimensional continuous process, self similar of order 14 and non Markovian, related to a fractional Brownian motion and for which a couple of representations are given.