Rectifiable-Reifenberg and the Regularity of Stationary and Minimizing Harmonic Maps

Abstract

In this paper we study the regularity of stationary and minimizing harmonic maps f:B2(p)⊂eq M N between Riemannian manifolds. If Sk(f)\x∈ M: no tangent map at x is k+1-symmetric\ is kth-stratum of the singular set of f, then it is well known that Sk≤ k, however little else about the structure of Sk(f) is understood in any generality. Our first result is for a general stationary harmonic map, where we prove that Sk(f) is k-rectifiable. In the case of minimizing harmonic maps we go further, and prove that the singular set S(f), which is well known to satisfy S(f)≤ n-3, is in fact n-3-rectifiable with uniformly finite n-3-measure. An effective version of this allows us to prove that |∇ f| has estimates in L3weak, an estimate which is sharp as |∇ f| may not live in L3. The above results are in fact just applications of a new class of estimates we prove on the quantitative stratifications Skε,r(f) and Skε(f) Skε,0(f). Roughly, Skε⊂eq M is the collection of points x∈ Skε for which no ball Br(x) is ε-close to being k+1-symmetric. We show that Skε is k-rectifiable and satisfies the Minkowski estimate Vol(Br\,Sεk)≤ C rn-k. The proofs require a new L2-subspace approximation theorem for stationary harmonic maps, as well as new W1,p-Reifenberg and rectifiable-Reifenberg type theorems. These results are generalizations of the classical Reifenberg, and give checkable criteria to determine when a set is k-rectifiable with uniform measure estimates. The new Reifenberg type theorems may be of some independent interest.