Branched Covers of Hyperbolic Groups
Abstract
Given a hyperbolic group G and a quasiconvex subgroup Q, we define a branched cover of G along g, which is a hyperbolic group H with a certain map into G. This builds on recent work on drilling hyperbolic groups and generalizes the case where G is the fundamental group of a closed hyperbolic 3-manifold M, Q Z is represented by an embedded geodesic loop γ, and H is the fundamental group of a branched cover of M with branching locus γ. We show that certain deepness assumptions on Dehn fillings induce branched covers, providing many examples of such branched covers. Some additional assumptions imply these branched covers have boundary S2, which may hold interest for the Cannon Conjecture.
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