Levy solutions of a randomly forced Burgers equation

Abstract

We consider the one dimensional Burgers equation forced by a brownian in space and white noise in time process ∂t u + u ∂x u = f(x,t), with 2E(f(x,t)f(y,s)) = (|x|+|y|-|x-y|)δ(t-s) and we show that there are Levy processes solutions, for which we give the evolution equation of the characteristic exponent. In particular we give the explicit solution in the case u0(x)=0.