Two-Generator Free Kleinian Groups and Hyperbolic Displacements

Abstract

The 3 Theorem, proved by Culler and Shalen, states that every point in the hyperbolic 3-space is moved a distance at least 3 by one of the non-commuting isometries or η provided that and η generate a torsion-free, discrete group which is not co-compact and contains no parabolic. This theorem lies in the foundation of many techniques that provide lower estimates for the volumes of orientable, closed hyperbolic 3-manifolds whose fundamental group has no 2-generator subgroup of finite index and, as a consequence, gives insights into the topological properties of these manifolds. In this paper, we show that every point in the hyperbolic 3-space is moved a distance at least (1/2)(5+32) by one of the isometries in \,η,η\ when and η satisfy the conditions given in the 3 Theorem.