Matrix Ap weights, degenerate Sobolev spaces, and mappings of finite distortion

Abstract

We study degenerate Sobolev spaces where the degeneracy is controlled by a matrix Ap weight. This class of weights was introduced by Nazarov, Treil and Volberg, and degenerate Sobolev spaces with matrix weights have been considered by several authors for their applications to PDEs. We prove that the classical Meyers-Serrin theorem, H = W, holds in this setting. As applications we prove partial regularity results for weak solutions of degenerate p-Laplacian equations, and in particular for mappings of finite distortion.