Connectivity in the space of framed hyperbolic 3-manifolds
Abstract
We prove that the space H∞ of framed infinite volume hyperbolic 3-manifolds is connected but not path connected. Two proofs of connectivity of this space, which is equipped with the geometric topology, are given, each utilizing the density theorem for Kleinian groups. In particular, we construct a hyperbolic 3-manifold whose set of framings is dense in H∞. Examples of paths in H∞ are discussed, including paths of geometrically finite manifolds limiting to certain infinite type geometric limits of quasi-Fuchsian manifolds. The discussion of paths culminates in describing an infinite family of non-tame hyperbolic 3-manifolds, each of whose set of framings is a path component of H∞, establishing that H∞ is not path connected.
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