Solutions of the Differential Inequality with a~Null Lagrangian: Regularity and Removability of Singularities
Abstract
We prove a theorem on self-improving regularity for derivatives of solutions of the inequality F(v'(x)) KG(v'(x)) constructed by means of a quasiconvex function F and a null Lagrangian G. We apply this theorem to improve the stability and H\"older regularity results of Egor2008 and to establish a theorem on removability of singularities for solutions of this inequality.
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