Euler characteristics, lengths of loops in hyperbolic 3-manifolds, and Wilson's Freiheitssatz

Abstract

Let p be a point of an orientable hyperbolic 3-manifold M, and let m1 and k2 be integers. Suppose that α1,…,αm are loops based at p having length less than (2k-1). We show that if G denotes the subgroup of π1(M,p) generated by [α1],…,[αm], then (G)-(G) k-2; here (G) denotes the Euler characteristic of the group G, which is always defined in this situation. This result is deduced from a result about an arbitrary finitely generated subgroup G of the fundamental group of an orientable hyperbolic 3-manifold. If is a finite generating set for G, we define the index\ of\ freedom iof() to be the largest integer k such that contains k elements that freely generate a rank-k free subgroup of G. We define the minimum\ index\ of\ freedom miof(G) to be iof( ), where ranges over all finite generating sets for G. The result is that (G)< iof(G). The author has recently learned that this is equivalent to a special case of a theorem about arbitrary finitely presented groups due to J. S. Wilson.