Volume and Homology for Hyperbolic 3-Orbifolds

Abstract

Let M be a closed, orientable, hyperbolic 3-orbifold such that π1( M) contains no hyperbolic triangle group. We show that strict upper bounds of 0.07625, 0.1525 and 0.22875 for vol\ M imply respective upper bounds of 23, 43 and 79 for H1( M; F2 ). Stronger results hold if we assume that the singular set is a link; specifically, under this assumption, strict upper bounds of 0.305, 0.4575, 0.61, 0.7625 and 0.915 for vol\ M imply respective upper bounds of 7, 13, 14, 28 and 29 for dim\ H1( M; F2 ). Irreducibility assumptions on the underlying manifold | M| of M, and of the underlying manifolds of certain coverings of M, also give stronger results. The upper bounds on H1( M; F2 ) for an orbifold M whose volume is subject to a suitable upper bound are deduced from upper bounds on dim\ H1(| M|; F2 ) for an orbifold M whose volume is subject to a suitable upper bound.