Macroscopic scalar curvature and local collapsing

Abstract

Consider a closed Riemannian n-manifold M admitting a negatively curved Riemannian metric. We show that for every Riemannian metric on M of sufficiently small volume, there is a point in the universal cover of M such that the volume of every ball of radius r ≥ 1 centered at this point is greater or equal to the volume of the ball of the same radius in the hyperbolic n-space. We also give an interpretation of this result in terms of macroscopic scalar curvature. This result, which holds more generally in the context of polyhedral length spaces, is related to a question of Guth. Its proof relies on a generalization of recent progress in metric geometry about the Alexandrov/Urysohn width involving the volume of balls of radius in a certain range with collapsing at different scales.