Cyclic-Schottky strata of Schottky space

Abstract

Schottky space Sg, where g ≥ 2 is an integer, is a connected complex orbifold of dimension 3(g-1); it provides a parametrization of the PSL2( C)-conjugacy classes of Schottky groups of rank g. The branch locus Bg ⊂ Sg, consisting of those conjugacy classes of Schottky groups being a finite index proper normal subgroup of some Kleinian group, is known to be connected. If [] ∈ Bg, then there is a Kleinian group K containing as a normal subgroup of index some prime integer p ≥ 2. The structural description, in terms of Klein-Maskit Combination Theorems, of such a group K is completely determined by a triple (t,r,s), where t,r,s ≥ 0 are integers such that g=p(t+r+s-1)+1-r. For each such a tuple (g,p;t,r,s) there is a corresponding cyclic-Schottky stratum F(g,p;t,r,s) ⊂ Bg. It is known that F(g,2;t,r,s) is connected.In this paper, for p ≥ 3, we study the connectivity of these F(g,p;t,r,s).