Holonomy invariants of links and nonabelian Reidemeister torsion

Abstract

We show that the reduced SL2(C)-twisted Burau representation can be obtained from the quantum group Uq(sl2) for q = i a fourth root of unity and that representations of Uq(sl2) satisfy a type of Schur-Weyl duality with the Burau representation. As a consequence, the SL2(C)-twisted Reidemeister torsion of links can be obtained as a quantum invariant. Our construction is closely related to the quantum holonomy invariant of Blanchet, Geer, Patureau-Mirand, and Reshetikhin, and we interpret their invariant as a twisted Conway potential.