On regularity theory for n/p-harmonic maps into manifolds

Abstract

In this paper we continue the investigation of the regularity of the so-called weak np-harmonic maps in the critical case. These are critical points of the following nonlocal energy \[ Ls(u)=∫Rn| ( -)s2 u(x)|p dx\,, \] where u∈ Hs,p(Rn,N) and N⊂RN is a closed k dimensional smooth manifold and s=np. We prove H\"older continuity for such critical points for p ≤ 2. For p > 2 we obtain the same under an additional Lorentz-space assumption. The regularity theory is in the two cases based on regularity results for nonlocal Schr\"odinger systems with an antisymmetric potential.