Lp-gradient harmonic maps into spheres and SO(N)

Abstract

We consider critical points of the energy E(v) := ∫Rn |∇s v|ns, where v maps locally into the sphere or SO(N), and ∇s = (∂1s,…,∂ns) is the formal fractional gradient, i.e. ∂αs is a composition of the fractional laplacian with the α-th Riesz transform. We show that critical points of this energy are H\"older continuous. As a special case, for s = 1, we obtain a new, more stable proof of Fuchs and Strzelecki's regularity result of n-harmonic maps into the sphere, which is interesting on its own.