Energy Identity for Stationary Harmonic Maps

Abstract

In this paper we consider sequences uj:B2⊂eq M N of stationary harmonic maps between smooth Riemannian manifolds with uniformly bounded energy E[uj] ∫ |∇ uj|2≤ Λ . After passing to a subsequence it is known one can limit uj u:B1 N with the associated defect measure |∇ uj|2 dvg |∇ u|2dvg+ν, where ν= e(x)\, Hm-2S is an m-2 rectifiable measure linstat. For a.e. x∈ S=supp(ν) one can produce a finite number of bubble maps bj:S2 N by blowing up the sequence uj near x. We prove the energy identity in this paper. Namely, we have at a.e. x∈ S that e(x)=Σj E[bj] for a complete set of such bubbles. That is, the energy density of the defect measure ν is precisely the sum of the energies of the bubbling maps.