Hyperbolic structures on link complements, octahedral decompositions, and quantum sl2

Abstract

Hyperbolic structures on link complements (equivalently, representations of the fundamental group into SL2(C)) can be described algebraically by using the octahedral decomposition determined by a link diagram. The decomposition (like any ideal triangulation) gives a set of gluing equations in shape parameters whose solutions are hyperbolic structures. We show that these equations can be obtained from Kashaev-Reshetikhin's braiding on the Kac-de Concini quantum group U(sl2) at a root of unity . This braiding gives coordinates on the SL2(C) representation variety of a link and our work shows how to interpret these geometrically.