Jorgensen's Inequality and Purely Loxodromic 2-Generator Free Kleinian Groups

Abstract

Let and η be two non--commuting isometries of the hyperbolic 3--space H3 so that =,η is a purely loxodromic free Kleinian group. For γ∈ and z∈H3, let dγz denote the distance between z and γ· z. Let z1 and z2 be the mid-points of the shortest geodesic segments connecting the axes of , ηη-1 and η-1η, respectively. In this manuscript it is proved that if dγz2<1.6068... for every γ∈\η, -1η, η-1\ and dηη-1z2≤ dηη-1z1, then \[ |trace2()-4|+|trace(η-1η-1)-2|≥ 22(14α) = 1.5937.... \] Above α=24.8692... is the unique real root of the polynomial 21 x4 - 496 x3 - 654 x2 + 24 x + 81 that is greater than 9. Also generalisations of this inequality for finitely generated purely loxodromic free Kleinian groups are conjectured.