On strong L2 convergence of time numerical schemes for the stochastic 2D Navier-Stokes equations

Abstract

We prove that some discretization schemes for the 2D Navier-Stokes equations subject to a random perturbation converge in L2(). This refines previous results which only established the convergence in probability of these numerical approximations. Using exponential moment estimates of the solution of the stochastic NS equations and convergence of a localized scheme, we can prove strong convergence of fully implicit and semi-implicit time Euler discretizations, and of a splitting scheme. The speed of the L2()-convergence depends on the diffusion coefficient and on the viscosity parameter.