Twisting Kuperberg invariants via Fox calculus and Reidemeister torsion

Abstract

We study Kuperberg invariants for sutured manifolds in the case of a semidirect product of an involutory Hopf superalgebra H with its automorphism group Aut(H). These are topological invariants of balanced sutured 3-manifolds endowed with a homomorphism of the fundamental group into Aut(H) and possibly with a Spinc structure and a homology orientation. We show that these invariants are computed via a form of Fox calculus and that, if H is N-graded, they can be extended in a canonical way to polynomial invariants. When H is an exterior algebra, we show that this invariant specializes to a refinement of the twisted relative Reidemeister torsion of sutured 3-manifolds. We also give an explanation of our Fox calculus formulas in terms of a particular Hopf group-algebra.