The deformation space of non-orientable hyperbolic 3-manifolds

Abstract

We consider non-orientable hyperbolic 3-manifolds of finite volume M3. When M3 has an ideal triangulation , we compute the deformation space of the pair (M3, ) (its Neumann Zagier parameter space). We also determine the variety of representations of π1(M3) in Isom(H3) in a neighborhood of the holonomy. As a consequence, when some ends are non-orientable, there are deformations from the variety of representations that cannot be realized as deformations of the pair (M3, ). We also discuss the metric completion of these structures and we illustrate the results on the Gieseking manifold.