Partial regularity for A-quasiconvex variational problems of linear growth

Abstract

We prove that minimizers of variational integrals E(v)=∫ f(v) v∈ M() such that A v=0, are partially continuous provided that the integrands f are strongly A-quasiconvex in a suitable sense. We consider linear growth problems, linear PDE operators A of constant rank, and variations of the form v+ with A-free ∈ Cc∞(). Our analysis also covers the ``potentials case'' F(u)=∫ f( B u) u∈ D'() such that B u∈ M(), where B is a different linear pde operator of constant rank. Both our main results extend to x-dependent integrands.