We study an asymptotic preserving scheme for the temporal discretization of a system of parabolic semilinear SPDEs with two time scales. Owing to the averaging principle, when the time scale separation ϵ vanishes, the slow component converges to the solution of a limiting evolution equation, which is captured when the time-step size Δt vanishes by a limiting scheme. The objective of this work is to prove weak error estimates which are uniform with respect to ϵ, in terms of Δt: the scheme satisfies a uniform accuracy property. This is a non trivial generalization of the recent article 10 in an infinite dimensional framework. The fast component is discretized using the modified Euler scheme for SPDEs introduced in the recent work 8. Proving the weak error estimates requires delicate analysis of the regularity properties of solutions of infinite dimensional Kolmogorov equations. Numerical experiments illustrate the asymptotic preserving property and the uniform weak error estimates.
Charles-Édouard Bréhier (Tue,) studied this question.
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