On high-dimensional representations of knot groups

Abstract

Given a hyperbolic knot K and any n≥ 2 the abelian representations and the holonomy representation each give rise to an (n-1)-dimensional component in the SL(n,C)-character variety. A component of the SL(n,C)-character variety of dimension ≥ n is called high-dimensional. It was proved by Cooper and Long that there exist hyperbolic knots with high-dimensional components in the SL(2,C)-character variety. We show that given any non-trivial knot K and sufficiently large n the SL(n,C)-character variety of K admits high-dimensional components.