SPDEs with fractional noise in space with index H<1/2

Abstract

In this article, we consider the stochastic wave and heat equations on R with non-vanishing initial conditions, driven by a Gaussian noise which is white in time and behaves in space like a fractional Brownian motion of index H, with 1/4<H<1/2. We assume that the diffusion coefficient is given by an affine function σ(x)=ax+b, and the initial value functions are bounded and H\"older continuous of order H. We prove the existence and uniqueness of the mild solution for both equations. We show that the solution is L2()-continuous and its p-th moments are uniformly bounded, for any p ≥ 2.