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A lift of the colored Jones polynomial of a knot

Published 2 Mar 2026 in math.GT, hep-th, and math.NT | (2603.01619v1)

Abstract: Habiro lifted the Witten-Reshetikhin-Turaev invariant of an integer homology 3-sphere (a complex-valued function on the set of complex roots of unity) to an element of the Habiro ring. We lift the colored Jones polynomial of a knot, with Alexander polynomial $Δ(t)$, to the recently introduced Habiro ring of the étale map $\mathbb{Z}[t{\pm 1}]\to \mathbb{Z}[t{\pm 1},Δ(t){-1}]$ (with Frobenius lifts $t\mapsto tp$ for all primes $p$). This implies the existence of a loop expansion at roots of unity (confirming a conjecture of Habiro), and a lift of power series invariants of Ohtsuki for 3-manifolds with Betti number 1 to a Habiro ring. Our results have natural extensions to the skein module of a knot complement, and they suggest a natural lift of the colored Jones polynomial colored by representations of a simple Lie (super) algebra.

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