Twisted Kuperberg invariants of knots and Reidemeister torsion via twisted Drinfeld doubles

Abstract

In this paper, we consider the Reshetikhin-Turaev invariants of knots in the three-sphere obtained from a twisted Drinfeld double of a Hopf algebra, or equivalently, the relative Drinfeld center of the crossed product Rep(H)(H). These are quantum invariants of knots endowed with a homomorphism of the knot group to Aut(H). We show that, at least for knots in the three-sphere, these invariants provide a non-involutory generalization of the Fox-calculus-twisted Kuperberg invariants of sutured manifolds introduced previously by the author, which are only defined for involutory Hopf algebras. In particular, we describe the SL(n,C)-twisted Reidemeister torsion of a knot complement as a Reshetikhin-Turaev invariant.