On the Hardy space theory of compensated compactness quantities

Abstract

We make progress on a problem of R. Coifman, P.-L. Lions, Y. Meyer, and S. Semmes from 1993 by showing that the Jacobian operator J does not map W1,n( Rn, Rn) onto the Hardy space H1( Rn) for any n 2. The related question about surjectivity of J W1,n( Rn, Rn) H1( Rn) is still open. The second main result and its variants reduce the proof of H1 regularity of a large class of compensated compactness quantities to an integration by parts or easy arithmetic, and applications are presented. Furthermore, we exhibit a class of nonlinear partial differential operators in which weak sequential continuity is a strictly stronger condition than H1 regularity, shedding light on another problem of Coifman, Lions, Meyer, and Semmes.