A measure-L∞ div-curl lemma

Abstract

In this note we give a very short proof of the div-curl lemma in the limit conjugate case M-L∞, where M is the set of Radon measures on Rd. The proof follows the classical approach by defining here the product in the sense of distributions via a non unique microlocal Hodge's decomposition. The result is valid for many other spaces than M-L∞, including the classical div-curl lemma spaces Lp-Lp' for 1<p<∞, and spaces of non conjugated regularity.

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