Quantitative estimates on the C2-singular sets in Alexandrov spaces

Abstract

The total disaster may be controllable if not preventable. We will explore this phenomenon for singularities in metric spaces. A point in an n-dimensional Alexandrov space is called regular if its tangent cone is isometric to Rn. Examples show that not every regular point is smooth, and the non-smooth points, away from the boundary, can have co-dimension 1. In this paper, we define a non-negative function K(x), which quantitatively measures the extent of the point x from being C2. The so-called C2-singular points are identified as the set where K>0. We show that ∫Br(p) K(x)\, d Hn-1 c(n,,)rn-2 for any n-dimensional Alexandrov space (X,p) with curv and Vol(B1(p))>0. This leads to the Hausdorff dimension estimate H\ K>0\ n-1, and the quantitative Hausdorff measure estimate Hn-1(\ K>ε\ Br(p)) ε-1· c(n,)rn-2. These results also make progress on Naber's conjecture on the convergence of curvature measures. The measure K(x)\, d Hn-1 on Alexandrov spaces can be viewed as the counterpart of the curvature measure scal \, d volg on smooth manifolds. We also show that if n-dimensional Alexandrov spaces Xi Gromov-Hausdorff converge to a smooth manifold with no boundary without collapsing, then Ki\, d Hn-1 0 as a measure.