Growth in the universal cover under large simplicial volume
Abstract
Consider a closed manifold M with two Riemannian metrics: one hyperbolic metric, and one other metric g. What hypotheses on g guarantee that for a given radius r, there are balls of radius r in the universal cover of (M, g) with greather-than-hyperbolic volumes? We show that this conclusion holds for all r ≥ 1 if (Vol (M, g))2 is less than a small constant times the hyperbolic volume of M. This strengthens a theorem of Sabourau and is partial progress toward a conjecture of Guth.
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