The Singular Structure and Regularity of Stationary and Minimizing Varifolds

Abstract

If one considers an integral varifold Im⊂eq M with bounded mean curvature, and if Sk(I)\x∈ M: no tangent cone at x is k+1-symmetric\ is the standard stratification of the singular set, then it is well known that Sk≤ k. In complete generality nothing else is known about the singular sets Sk(I). In this paper we prove for a general integral varifold with bounded mean curvature, in particular a stationary varifold, that every stratum Sk(I) is k-rectifiable. In fact, we prove for k-a.e. point x∈ Sk that there exists a unique k-plane Vk such that every tangent cone at x is of the form V× C for some cone C. In the case of minimizing hypersurfaces In-1⊂eq Mn we can go further. Indeed, we can show that the singular set S(I), which is known to satisfy S(I)≤ n-8, is in fact n-8 rectifiable with uniformly finite n-8 measure. An effective version of this allows us to prove that the second fundamental form A has apriori estimates in L7weak on I, an estimate which is sharp as |A| is not in L7 for the Simons cone. In fact, we prove the much stronger estimate that the regularity scale rI has L7weak-estimates. The above results are in fact just applications of a new class of estimates we prove on the quantitative stratifications Skε,r and Skε Skε,0. Roughly, x∈ Skε⊂eq I if 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)≤ Cε rn-k. The proof requires a new L2-subspace approximation theorem for integral varifolds with bounded mean curvature, and a W1,p-Reifenberg type theorem proved by the authors in NaVa+.