A quantization of the SL2(C) Chern-Simons invariant of tangle exteriors

Abstract

We define a sequence of invariants ZNψ of tangles with flat sl2 connections (i.e. hyperbolic structures) on their complements. These can be interpreted as a geometric twist of the Kashaev invariant or as a quantization of the SL2(C) Chern-Simons invariant. To support the second interpretation we give a new description Iψ of the Chern-Simons invariant of a tangle exterior. ZNψ directly recovers Iψ when N = 1. We build ZNψ using modules over unrestricted quantum sl2 at a root of unity and the holonomy R-matrices previously constructed by the author and Reshetikhin (arXiv:2509.02354). Unlike most previous constructions of geometric quantum invariants ZNψ is defined without any phase ambiguity. It is natural to conjecture that ZNψ is related to the quantization of Chern-Simons theory with complex, noncompact gauge group SL2(C) and we discuss how to interpret our results in this context.