Lp-estimates and regularity for SPDEs with monotone semilinearity

Abstract

Semilinear stochastic partial differential equations on bounded domains D are considered. The semilinear term may have arbitrary polynomial growth as long as it is continuous and monotone except perhaps near the origin. Typical examples are the stochastic Allen--Cahn and Ginzburg--Landau equations. The first main result of this article are Lp-estimates for such equations. The Lp-estimates are subsequently employed in obtaining higher regularity. This is motivated by ongoing work to obtain rate of convergence estimates for numerical approximations to such equations. It is shown, under appropriate assumptions, that the solution is continuous in time with values in the Sobolev space H2(D') and 2-integrable with values in H3(D'), for any compact D' ⊂ D. Using results from Lp-theory of SPDEs obtained by Kim~kim04 we get analogous results in weighted Sobolev spaces on the whole D. Finally it is shown that the solution is H\"older continuous in time of order 12 - 2q as a process with values in a weighted Lq-space, where q arises from the integrability assumptions imposed on the initial condition and forcing terms.