A quantitative version of a theorem by Jungreis

Abstract

A fundamental result by Gromov and Thurston asserts that, if M is a closed hyperbolic n-manifold, then the simplicial volume |M| of M is equal to vol(M)/vn, where vn is a constant depending only on the dimension of M. The same result also holds for complete finite-volume hyperbolic manifolds without boundary, while Jungreis proved that the ratio vol(M)/|M| is strictly smaller than vn if M is compact with non-empty geodesic boundary. We prove here a quantitative version of Jungreis' result for n>3, which bounds from below the ratio |M|/vol(M) in terms of the ratio between the volume of the boundary of M and the volume of M. As a consequence, we show that a sequence Mi of compact hyperbolic n-manifolds with geodesic boundary is such that the limit of vol(Mi)/|Mi| equals vn if and only if the volume of the boundary of Mi grows sublinearly with respect to the volume of the boundary of Mi. We also provide estimates of the simplicial volume of hyperbolic manifolds with geodesic boundary in dimension three.