On the Sormani-Wenger Intrinsic Flat Convergence of Alexandrov Spaces

Abstract

We study sequences of integral current spaces (Xj,dj,Tj) such that the integral current structure Tj has weight 1 and no boundary and, all (Xj,dj) are closed Alexandrov spaces with curvature uniformly bounded from below and diameter uniformly bounded from above. We prove that for such sequences either their limits collapse or the Gromov-Hausdorff and Sormani-Wenger Intrinsic Flat limits agree. The latter is done showing that the lower n dimensional density of the mass measure at any regular point of the Gromov-Hausdorff limit space is positive by passing to a filling volume estimate. In an appendix we show that the filling volume of the standard n dimensional integral current space coming from an n dimensional sphere of radius r>0 in Euclidean space equals rn times the filling volume of the n dimensional integral current space coming from the n dimensional sphere of radius 1.