Space-time approximation of stochastic p-Laplace systems

Abstract

We consider systems of stochastic evolutionary equations of the p-Laplace type. We establish convergence rates for a finite-element based space-time approximation, where the error is measured in a suitable quasi-norm. Under natural regularity assumptions on the solution, our main result provides linear convergence in space and convergence of order α in time for all α∈(0,12). The key ingredient of our analysis is a random time-grid, which allows us to compensate for the lack of time regularity. Our theoretical results are confirmed by numerical experiments.