Singular Behavior of the Solution to the Stochastic Heat Equation on a Polygonal Domain

Abstract

We study the stochastic heat equation with trace class noise and zero Dirichlet boundary condition on a bounded polygonal domain O in R2. It is shown that the solution u can be decomposed into a regular part uR and a singular part uS which incorporates the corner singularity functions for the Poisson problem. Due to the temporal irregularity of the noise, both uR and uS have negative L2-Sobolev regularity of order s<-1/2 in time. The regular part uR admits spatial Sobolev regularity of order r=2, while the spatial Sobolev regularity of uS is restricted by r<1+π/γ, where γ is the largest interior angle at the boundary of O. We obtain estimates for the Sobolev norm of uR and the Sobolev norms of the coefficients of the singularity functions. The proof is based on a Laplace transform argument w.r.t. the time variable. The result is of interest in the context of numerical methods for stochastic PDEs.