Generalized Teichm\"uller space of non-compact 3-manifolds and Mostow rigidity

Abstract

Consider a 3-dimensional manifold N obtained by gluing a finite number of ideal hyperbolic tetrahedra via isometries along their faces. By varying the isometry type of each tetrahedron but keeping fixed the gluing pattern we define a space T of complete hyperbolic metrics on N with cone singularities along the edges of the tetrahedra. We prove that T is homeomorphic to a Euclidean space and we compute its dimension. By means of examples, we examine if the elements of % T are uniquely determined by the angles around the edges of N.