A counterexample to maximal Lp-regularity of the stochastic heat equation in polygons: the case p>4

Abstract

Let D be a domain in Rd and u be the solution to the stochastic heat equation du= u dt+ g\,dWt, t>0, x∈ D, with zero initial and boundary data. Here Wt is a one-dimensional Wiener process on a probability space . It has been proved (see below for references) that for any p≥ 2 the inequality \|∇ u\|Lp(× [0,T]× D) ≤ c \|g\|Lp(× [0,T]× D) holds if ∂ D∈ C1. In this note we prove that if p>4 then this inequality fails in any polygon in R2 having an angle greater than or equal to pπ2(p-2). We also show that a similar statement holds in higher dimensional polygons. The counterexample introduced here is based on personal communication with N.V. Krylov.