The continuous part of the axial distance spectrum for Kleinian groups

Abstract

Elements f of finite order in the isometry group of hyperbolic three-space 3 have a hyperbolic line as a fixed point set, this line is the axis of f. The possible hyperbolic distances between axes of elements of order p and q, not both two, among all discrete subgroups of Isom+(3) has an initial discrete spectrum \[ 0 =δ0< δ1 < δ2 < … <δ∞,\] each value taken with finite multiplicity, and above δ∞ this spectrum of possible distances is continuous. The value δ∞ is the smallest number with the property that for each λ<1 there are only finitely many discrete groups generated by elements of order p and q whose axes are no more than λ δ∞(p,q) apart. Geometrically δ∞ places a bound on embedded tubular neighbourhoods of components of the singular set in the orbifold quotients 3/ and provides other geometric information about this set. The value δ1(p,q) is known and tends to ∞ with \p,q\. Here we seek to determine - actually find asymptotically sharp upper-bounds for - δ∞(p,q). We also show that the gap δ∞(p,q)-δ1(p,q) is surprisingly small, less than 1.4059…, the sharp value for the Fuchsian case, independent of p and q. This is despite both of these numbers tending to ∞ with either p or q.