An analysis of a class of variational multiscale methods based on subspace decomposition

摘要

Numerical homogenization tries to approximate the solutions of elliptic partial differential equations with strongly oscillating coefficients by functions from modified finite element spaces. We present a class of such methods that are closely related to the methods that have recently been proposed by M?lqvist and Peterseim [Math. Comp. 83, 2014, pp. 2583-2603]. Like these methods, the new methods do not make explicit or implicit use of a scale separation. Their comparatively simple analysis is based on the theory of additive Schwarz or subspace decomposition methods.