A note on the topological stability theorem from RCD spaces to Riemannian manifolds

Abstract

Inspired by a recent work of Wang-Zhao, in this note we prove that for a fixed n-dimensional closed Riemannian manifold (Mn, g), if an RCD(K, n) space (X, d, m) is Gromov-Hausdorff close to Mn, then there exists a regular homeomorphism F from X to Mn such that F is Lipschitz continuous and that F-1 is H\"older continuous, where the Lipschitz constant of F, the H\"older exponent and the H\"older constant of F-1 can be chosen arbitrary close to 1. This is sharp in the sense that in general such a map cannot be improved to being bi-Lipschitz. Moreover if X is smooth, then such a homeomorphism can be chosen as a diffeomorphism. It is worth mentioning that the Lipschitz-H\"older continuity of F improves the intrinsic Reifenberg theorem for closed manifolds with Ricci curvature bounded below established by Cheeger-Colding. The Nash embedding theorem plays a key role in the proof.