The ghost character of the (4,5)-torus knot and its applications

Abstract

We show that the (4,5)-torus knot T4,5 admits exactly one ghost character. We then show that this ghost character provides the following two important results. (1) It is known that for any knot K every (meridionally) trace-free 2()-representation of the knot group G(K) yields an 2()-representation of the fundamental group π1(2K) of the 2-fold branched cover 2K of the 3-sphere along K. This correspondence often but not always provides all 2()-representations of π1(2K). We show by using the ghost character that T4,5 is the simplest torus knot such that π1(2T4,5) admits an 2()-representation which cannot be realized by any trace-free 2()-representations. (2) We show that T4,5 is the simplest torus knot that provides a counterexample to Ng's conjecture, concerned with a polynomial map h* between the character variety X(2K) of π1(2K) and the fundamental variety F2(K). More precisely, the map h* is surjective but not injective, and hence not an isomorphism for T4,5.