On the Well-Posedness of Global Fully Nonlinear First Order Elliptic Systems

Abstract

In the very recent paper [K1], the second author proved that for any f∈ L2(Rn,RN), the fully nonlinear first order system F(·,D u) =f is well posed in the so-called J.L. Lions space and moreover the unique strong solution u:Rn RN to the problem satisfies a quantitative estimate. A central ingredient in the proof was the introduction of an appropriate notion of ellipticity for F inspired by Campanato's classical work in the 2nd order case. Herein we extend the results of [K1] by introducing a new strictly weaker ellipticity condition and by proving well posedness in the same "energy" space.