Small ball probabilities for the stochastic heat equation with colored noise

Abstract

We consider the stochastic heat equation on the 1-dimensional torus T:=[-1,1] with periodic boundary conditions: ∂t u(t,x)=∂2x u(t,x)+σ(t,x,u)F(t,x), x∈ T,t∈R+, where F(t,x) is a generalized Gaussian noise, which is white in time and colored in space. Assuming that σ is Lipschitz in u and uniformly bounded, we estimate small ball probabilities for the solution u when u(0,x) 0.