Fine properties of symmetric and positive matrix fields with bounded divergence
Abstract
This paper is concerned with various fine properties of the functional \[ D(A) = ∫Tndet1n-1(A(x))\,dx \] introduced in [33]. This functional is defined on Xp, which is the cone of matrix fields A ∈ Lp(Tn;Sym+(n)) with div (A) a bounded measure. We start by correcting a mistake we noted in our [13, Corollary 7], which concerns the upper semicontinuity of D(A) in Xp. We give a proof of a refined correct statement, and we will use it to study the behaviour of D(A) when A ∈ Xnn-1, which is the critical integrability for D(A). One of our main results gives an explicit bound of the measure generated by D(Ak) for a sequence of such matrix fields \Ak\k. In particular it allows us to characterize the upper semicontinuity of D(A) in the case A ∈ Xnn - 1 in terms of the measure generated by the variation of \div Ak\k. We show by explicit example that this characterization fails in Xp if p<nn-1. As a by-product of our characterization we also recover and generalize a result of P.-L. Lions [25,26] on the lack of compactness in the study of Sobolev embeddings. Furthermore, in analogy with Monge-Amp\`ere theory, we give sufficient conditions under which det1n-1(A) is Hardy when A ∈ Xnn - 1, generalising the celebrated result of S. M\"uller [29] when A=cof D2, for a convex function .
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.