Exponential Convergence of Non-Linear Monotone SPDEs

Abstract

For a Markov semigroup Pt with invariant probability measure μ, a constant >0 is called a lower bound of the ultra-exponential convergence rate of Pt to μ, if there exists a constant C∈ (0,∞) such that μ(f2) 1\|Ptf-μ(f)\|∞ C - t,\ \ t 1. By using the coupling by change of measure in the line of [F.-Y. Wang, Ann. Probab. 35(2007), 1333--1350], explicit lower bounds of the ultra-exponential convergence rate are derived for a class of non-linear monotone stochastic partial differential equations. The main result is illustrated by the stochastic porous medium equation and the stochastic p-Laplace equation respectively. Finally, the V-uniformly exponential convergence is investigated for stochastic fast-diffusion equations.