Fibering of double twist knots via the adjoint hyperbolic torsion polynomial
Abstract
For a hyperbolic knot K in S3, the adjoint hyperbolic torsion polynomial TAdK(t) ∈ C[t 1] is defined as a normalization of the twisted Alexander polynomial of K associated with the SL3( C)-representation obtained by composing the holonomy representation of K with the adjoint action of SL2( C) on its Lie algebra sl2( C). In this paper we consider the adjoint hyperbolic torsion polynomial for a two-parameter family of rational knots called double twist knots, and show that TAdK(t) determines the genus and fibering of this family by using algebraic integers.
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