Harnack Inequalities and Ergodicity of Stochastic Reaction-Diffusion Equation in Lp

Abstract

We derive Harnack inequalities for a stochastic reaction-diffusion equation with dissipative drift driven by additive irregular noise in the Lp-space for any p 2. These inequalities are utilized to investigate the ergodicity of the corresponding Markov semigroup (Pt). The main ingredient of our method is a coupling by the change of measure. Applying our results to the stochastic reaction-diffusion equation with a super-linear growth drift having a negative leading coefficient, perturbed by a Lipschitz term, indicates that (Pt) possesses a unique and thus ergodic invariant measure in Lp for all p 2, which is independent of the Lipschitz term.