Null Lagrangian Measures in subspaces, compensated compactness and conservation laws

Abstract

Compensated compactness is an important method used to solve nonlinear PDEs. A simple formulation of a compensated compactness problem is to ask for conditions on a set K⊂ Mm× n such that n→ ∞ dist(Dun,K)Lp→ 0\; ⇒ \Dun\n is precompact. Let M1,M2,…, Mq denote the set of minors of Mm× n. A sufficient condition for this is that any measure μ supported on K satisfying ∫ Mk(X) dμ (X)=Mk(∫ X dμ (X)) for k=1,2,…, q is a Dirac measure. We call measures that satisfy the above equation "Null Lagrangian Measures" and we denote the set of Null Lagrangian Measures supported on K by Mpc(K). For general m,n, a necessary and sufficient condition for triviality of Mpc(K) was an open question even in the case where K is a linear subspace of Mm× n. We answer this question and provide a necessary and sufficient condition for any linear subspace K⊂ Mm× n. The ideas also allow us to show that for any d∈ \1,2,3\, d-dimensional subspaces K⊂ Mm× n support non-trivial Null Lagrangian Measures if and only if K has Rank-1 connections. This is known to be false for d 4. Using the ideas developed we are able to answer (up to first order) a question of Kirchheim, M\"uller and Sverak on the Null Lagrangian measures arising in the study of a (one) entropy solution of a 2× 2 system of conservation laws that arises in elasticity.