Weak order for the discretization of the stochastic heat equation

Abstract

In this paper we study the approximation of the distribution of Xt Hilbert--valued stochastic process solution of a linear parabolic stochastic partial differential equation written in an abstract form as dXt+AXt dt = Q1/2 d Wt, X0=x ∈ H, t∈[0,T], driven by a Gaussian space time noise whose covariance operator Q is given. We assume that A-α is a finite trace operator for some α>0 and that Q is bounded from H into D(Aβ) for some β≥ 0. It is not required to be nuclear or to commute with A. The discretization is achieved thanks to finite element methods in space (parameter h>0) and implicit Euler schemes in time (parameter Δt=T/N). We define a discrete solution Xnh and for suitable functions ϕ defined on H, we show that | ϕ(XNh) - ϕ(XT) | = O(h2γ + Δtγ) where γ<1- α+ β. Let us note that as in the finite dimensional case the rate of convergence is twice the one for pathwise approximations.