A compensated compactness theorem for pseudodifferential operators on vector bundles

Abstract

We establish a compensated compactness theorem in the microlocal and geometric analytic framework. For a weakly L2 loc-convergent sequence of sections of a vector bundle over a semi-Riemannian manifold whose image under a pseudo-differential operator A of order s>0 is precompact in H-s loc, we show that a quadratic form Q acting on this sequence converges in the distributional sense, provided that Q vanishes on the operator cone of A. This extends the classical Murat--Tartar theory of compensated compactness from constant-coefficient first-order differential constraints on Euclidean spaces to variable-coefficient pseudo-differential constraints of arbitrary order on semi-Riemannian manifolds.