Low-energy α-harmonic maps into the round sphere

Abstract

We classify low-energy α-harmonic maps from a closed non-spherical Riemannian surface of constant curvature to the round sphere via their bubble scales and centres. In particular we show that as 1<α 1 and assuming Eα is close to | |+4π then degree-one α-harmonic maps blow a bubble based at a critical point ac of a an explicit function J and at scale |J(ac)|-1(α-1). Up to a constant, J is the sum of the squares of any L2-orthonormal basis of holomorphic one-forms on the domain.