Regularizing properties of n-Laplace systems with antisymmetric potentials in Lorentz spaces

Abstract

We show continuity of solutions u ∈ W1,n(Bn,RN) to the system \[ - div (|∇ u|n-2 ∇ u) = · |∇ u|n-2 ∇ u \] when is an Ln-antisymmetric potential -- and additionally satisfies a Lorentz-space assumption. To obtain our result we study a rotated n-Laplace system \[ - div (Q|∇ u|n-2 ∇ u) = · |∇ u|n-2 ∇ u, \] where Q ∈ W1,n(Bn,SO(N)) is the Coulomb gauge which ensures improved Lorentz-space integrability of . Because of the matrix-term Q, this system does not fall directly into Kuusi-Mingione's vectorial potential theory. However, we adapt ideas of their theory together with Iwaniec' stability result to obtain L(n,∞)-estimates of the gradient of a solution which, by an iteration argument leads to the regularity of solutions. As a corollary of our argument we see that n-harmonic maps into manifolds are continuous if their gradient belongs to the Lorentz-space L(n,2) -- which is a trivial and optimal assumption if n=2, and the weakest assumption to date for the regularity of critical n-harmonic maps, without any added differentiability assumption. We also discuss an application to H systems.