On Culler-Shalen seminorms and Dehn filling

Abstract

Consider the exterior M of a hyperbolic knot lying in a closed, connected, orientable 3-manifold. Culler and Shalen defined norm on H1(dM;R) using the SL(2,C) character variety of pi1(M). The Culler-Shalen norm encodes many topological properties of M; in particular it provides information about Dehn fillings of M. Their construction may be applied to arbitrary curves in the SL2(C)-character variety of a connected, compact, orientable, irreducible 3-manifold whose boundary is a torus, though in this generality one can only guarantee that it will define a seminorm. The first half of this paper is devoted to the development of the general theory of Culler-Shalen seminorms defined for curves of PSL2(C)-characters. By working over PSL2(C) we obtain a theory that is more generally applicable than its SL2(C) counterpart, while being only mildly more difficult to set up. In the second half of this paper we apply the theory of Culler-Shalen seminorms to study the Dehn filling operation. In particular we examine the relationship between fillings which yield manifolds having a positive dimensional PSL2(C)-character variety with those that yield manifolds having a finite or cyclic fundamental group. In one interesting application of this work we show that manifolds resulting from a nonintegral surgery on a knot in the 3-sphere tend to have a zero-dimensional PSL2(C)-character variety. As a consequence we obtain an infinite family of closed, orientable, hyperbolic Haken manifolds which have zero-dimensional PSL2(C)-character varieties.

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