A Non-Abelian Generalization of the Alexander Polynomial from Quantum sl3

Abstract

One construction of the Alexander polynomial is as a quantum invariant associated with representations of restricted quantum sl2 at a fourth root of unity. We generalize this construction to define a link invariant g for any semisimple Lie algebra g of rank n, taking values in n-variable Laurent polynomials. Focusing on the case g=sl3, we establish a direct relation between sl3 and the Alexander polynomial. We show that certain parameter evaluations of sl3 recover the Alexander polynomial on knots, despite the R-matrix not satisfying the Alexander-Conway skein relation at these points. We tabulate sl3 for all knots up to seven crossings and various other examples, including the Kinoshita-Terasaka knot and Conway knot mutant pair which are distinguished by this invariant.