Stochastic maximal Lp-regularity

Abstract

In this article we prove a maximal Lp-regularity result for stochastic convolutions, which extends Krylov's basic mixed Lp(Lq)-inequality for the Laplace operator on Rd to large classes of elliptic operators, both on Rd and on bounded domains in Rd with various boundary conditions. Our method of proof is based on McIntosh's H∞-functional calculus, R-boundedness techniques and sharp Lp(Lq)-square function estimates for stochastic integrals in Lq-spaces. Under an additional invertibility assumption on A, a maximal space--time Lp-regularity result is obtained as well.