Small optimal Margulis numbers force upper volume bounds

Abstract

If λ is a positive real number strictly less than 3, there is a positive number Vλ such that every orientable hyperbolic 3-manifold of volume greater than Vλ admits λ as a Margulis number. If λ<(3)/2, such a Vλ can be specified explicitly, and is bounded above by λ(6+8803-2λ13-2λ), where denotes the natural logarithm. These results imply that for λ<3, an orientable hyperbolic 3-manifold that does not have λ as a Margulis number has a rank-2 subgroup of bounded index in its fundamental group, and in particular has a fundamental group of bounded rank. Again, the bounds in these corollaries can be made explicit if λ<(3)/2.