Quantitative Estimates on the Singular Sets of Alexandrov Spaces

Abstract

Let X∈Alex\,n(-1) be an n-dimensional Alexandrov space with curvature -1. Let the r-scale (k,ε)-singular set Skε,\,r(X) be the collection of x∈ X so that Br(x) is not ε r-close to a ball in any splitting space Rk+1× Z. We show that there exists C(n,ε)>0 and β(n,ε)>0, independent of the volume, so that for any disjoint collection \Bri(xi):xi∈ Sε,\,β rik(X) B1, \,ri 1\, the packing estimate Σ rik C holds. Consequently, we obtain the Hausdorff measure estimates Hk( Skε(X) B1) C and Hn(Br ( Skε,\,r(X)) B1(p))≤ C\,rn-k. This answers an open question asked by Kapovitch and Lytchak. We also show that the k-singular set Sk(X)=ε>0(r>0 Skε,\,r) is k-rectifiable and construct examples to show that such a structure is sharp. For instance, in the k=1 case we can build for any closed set T⊂eq S1 and ε>0 a space Y∈Alex3(0) with S1ε(Y)=φ(T), where φ S1 Y is a bi-Lipschitz embedding. Taking T to be a Cantor set it gives rise to an example where the singular set is a 1-rectifiable, 1-Cantor set with positive 1-Hausdorff measure.