Drilling hyperbolic groups
Abstract
Given a hyperbolic group G and a maximal infinite cyclic subgroup g , we define a drilling of G along g, which is a relatively hyperbolic group pair (G, P). This is inspired by the well-studied procedure of drilling a hyperbolic 3--manifold along an embedded geodesic. We prove that, under suitable conditions, a hyperbolic group with 2-sphere boundary admits a drilling where the resulting relatively hyperbolic group pair (G, P) has relatively hyperbolic boundary S2. This allows us to reduce the Cannon Conjecture (in the residually finite case) to a relative version, which is likely to be more tractable.
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