Peripheral subgroups of Kleinian groups

Abstract

The conformal boundary of a hyperbolic 3-manifold M is a union of Riemann surfaces. If any of these Riemann surfaces has a nontrivial Teichm\"uller space, then the hyperbolic metric of M can be deformed quasi-isometrically. These deformations correspond to small pertubations in the matrices of the holonomy group π1(M) ⊂ PSL(2,C) , which together give an island of discrete representations around the identity map in X=Hom(π1(M), PSL(2,C)) . Determining the extent of this island is a hard problem. If M is geometrically finite and its convex core boundary is pleated only along simple closed curves, then we cut up its conformal boundary in a way governed by the pleating combinatorics to produce a fundamental domain for π1(M) that is combinatorially stable under small deformations, even those which change the pleating structure. We give a computable region in X, cut out by polynomial inequalities over R, within which this fundamental domain is valid: all the groups in the region have peripheral structures that look `coarsely similar', in that they come from real-algebraically deforming a fixed conformal polygon and its side-pairings. The union of all these regions for different pleating laminations gives a countable cover, with sets of controlled topology, of the entire quasi-isometric deformation space of π1(M) -- which is known to be topologically wild.