L∞ estimates and integrability by compensation in Besov-Morrey spaces and applications

Abstract

L∞ estimates in the integrability by compensation result of H. Wente fail in dimension larger than two when Sobolev spaces are replaced by the ad-hoc Morrey spaces. However, in this paper we prove that L∞ estimates hold in arbitrary dimension when Morrey spaces are replaced by their Littlewood Paley counterparts: Besov-Morrey spaces. As an application we prove the existence of conservation laws to solution of elliptic systems of the form - u= · ∇ u where is antisymmetric and both ∇ u and belong to these Besov-Morrey spaces for which the system is critical.