Regularity of generalized sphere valued \(p\)-harmonic maps with small mean oscillations (Q1434243)

The author gives a \(C^\infty\) result for harmonic maps \(u\) into a round sphere under the assumption that \(|\nabla u|\) in \(L^q\) for every \(q> 1\) and that the BMO norm of \(u\) is small enough. A version of the result adapted to \(p\)-harmonic maps is also presented. The main tools in the proof are the duality between Hardy and BMO spaces the \(L^p\) stability of Hodge decomposition and the reverse Hölder inequalities.