Asymptotic Preserving numerical schemes for multiscale parabolic problems

Abstract

We consider a class of multiscale parabolic problems with diffusion coefficients oscillating in space at a possibly small scale . Numerical homogenization methods are popular for such problems, because they capture efficiently the asymptotic behaviour as → 0, without using a dramatically fine spatial discretization at the scale of the fast oscillations. However, known such homogenization schemes are in general not accurate for both the highly oscillatory regime → 0 and the non oscillatory regime 1. In this paper, we introduce an Asymptotic Preserving method based on an exact micro-macro decomposition of the solution which remains consistent for both regimes.