Volume and Homology for Hyperbolic 3-Orbifolds, I

Abstract

Let M be a closed, orientable, hyperbolic 3-orbifold whose singular set is a link, and such that π1( M) contains no hyperbolic triangle group. We show that if the underlying manifold | M| is irreducible, and | M| is irreducible for every two-sheeted (orbifold) covering M of M, and if vol M1.72, then H1( M; Z2) 15. Furthermore, if vol M1.22 then H1( M; Z2) 11, and if vol M0.61 then H1( M; Z2) 7. The proof is an application of results that will be used in the sequel to this paper to obtain qualitatively similar results without the assumption of irreducibility of | M| and | M|.