Abstract
Question: "Under what curvature assumptions on a complete open manifold is the volume of balls of a fixed radius bounded below independent of the center point?" Two theorems establish such assumptions and two examples sharply limit their weakening. In particular we give an example of a metric on R 4 {{\mathbf {R}}^4} (extending to higher dimensions) of positive Ricci curvature, whose sectional curvatures decay to 0 0 , and such that the volume of balls goes uniformly to 0 0 as the center goes to infinity.
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