Some topological results of Ricci limit spaces

Abstract

We study the topology of a Ricci limit space (X,p), which is the Gromov-Hausdorff limit of a sequence of complete n-manifolds (Mi, pi) with Ric -(n-1). Our first result shows that, if Mi has Ricci bounded covering geometry, i.e. the local Riemannian universal cover is non-collapsed, then X is semi-locally simply connected. In the process, we establish a slice theorem for isometric pseudo-group actions on a closed ball in the Ricci limit space. In the second result, we give a description of the universal cover of X if Mi has a uniform diameter bound.