Deformation of hyperbolic manifolds in PGL(n, C) and discreteness of the peripheral representations

Abstract

Let M be a cusped hyperbolic 3-manifold, e.g. a knot complement. Thurston showed that the space of deformations of its fundamental group in PGL(2, C) (up to conjugation) is of complex dimension the number of cusps near the hyperbolic representation. It seems natural to ask whether some representations remain discrete after deformation. The answer is generically not. A simple reason for it lies inside the cusps: the degeneracy of the peripheral representation (i.e. representations of fundamental groups of the peripheral tori). They indeed generically become non-discrete, except for a countable set. This last set corresponds to hyperbolic Dehn surgeries on M, for which the peripheral representation is no more faithful.We work here in the framework of PGL(n, C). The hyperbolic structure lifts, via the n-dimensional irreducible representation, to a representation \ geom. We know from the work of Menal-Ferrer and Porti that the space of deformations of \ geom has complex dimension (n-1) .We prove here that, unlike the PGL(2)-case, the generic behaviour becomes the discreteness (and faithfulness) of the peripheral representation: in a neighbourhood of the geometric representation, the non-discrete peripheral representations are contained in a real analytic subvariety of codimension ≥ 1.