Small ball probabilities and a support theorem for the stochastic heat equation

Abstract

We consider the following stochastic partial differential equation on t ≥ 0, x∈[0,J], J ≥ 1 where we consider [0,J] to be the circle with end points identified: equation* ∂t u(t,x) =12\,∂x2 u(t,x) + g(t,x, u) + σ(t,x, u) W(t,x) , equation* and W (t,x) is 2-parameter d-dimensional vector valued white noise and σ is function from R+× R × Rd → Rd to space of symmetric d× d matrices which is Lipschitz in u. We assume that σ is uniformly elliptic and that g is uniformly bounded. Assuming that u(0,x) 0, we prove small-ball probabilities for the solution u. We also prove a support theorem for solutions, when u(0,x) is not necessarily zero.