Higher integrability for solutions to a system of critical elliptic PDE

Abstract

We give new estimates for a critical elliptic system introduced by Rivi\`ere-Struwe in rivierestruwe (see also the work of Rupflin rupflin and Schikorra schikorraframes), which generalises PDE solved by harmonic (and almost harmonic) maps from a Euclidean ball B1 n into Riemannian manifolds. Solutions take the form - u = . u where is an anti-symmetric potential with and u belonging to the Morrey space 2,n-2 making the PDE critical from a regularity perspective (classical theory gives one estimates on u in the weak-Morrey space (2,∞),n-2, see Sections adamsdecay and Morrey for definitions if necessary). We use the Coulomb frame method employed in rivierestruwe along with the H\"older regularity already acquired in rupflin, coupled with an extension of a Riesz potential estimate of Adams adamsriesz in order to attain estimates on 2 u ∈ s, n-2 for any s<2. These methods apply when n=2 thereby re-proving the full regularity in this case (see ShTo) using Coulomb gauge methods. Moreover they lead to a self contained proof of the local regularity of stationary harmonic maps in high dimension (see Corollary highint).