Adaptive Local (AL) Basis for Elliptic Problems with L∞-Coefficients
Abstract
We define a generalized finite element method for the discretization of elliptic partial differential equations in heterogeneous media. An adaptive local finite element basis (AL basis) on a coarse mesh which does not resolve the matrix of the media is constructed by solving finite-dimensional localized problems. The method requires O(log(1/H)d+1) basis functions per mesh point. We prove that the optimal finite element convergence rates are preserved.
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