Gromov-Hausdorff Limits of Aspherical Manifolds
Xiaochun Rong
Abstract
Let $X$ be a compact Gromov-Hausdorff limit space of a collapsing sequence of compact $n$-manifolds, $M_i$, of Ricci curvature $\text{Ric}_{M_i}\ge -(n-1)$ and all points in $M_i$ are $(δ,ρ)$-local rewinding Reifenberg points, or sectional curvature $\text{sec}_{M_i}\ge -1$, respectively. We conjecture that if $M_i$ is an aspherical manifold of fundamental group satisfying a certain condition (e.g., a nilpotent group), then $X$ is a differentiable, or topological aspherical manifold, respectively. A main result in this paper asserts that if $M_i$ a diffeomorphic or homeomorphic to a nilmanifold, then $X$ is diffeomorphic or homeomorphic to a nilmanifold, respectively.