A Geometric Quantisation view on the AJ-conjecture for the Teichm\"uller TQFT

TL;DR

This paper formulates the AJ-conjecture within a Geometric Quantisation framework for Teichmüller TQFT and proves it for specific knot complements, linking quantum invariants to classical algebraic curves.

Contribution

It introduces a Geometric Quantisation approach to the AJ-conjecture for Teichmüller TQFT and verifies it for the knot complements of 4_1 and 5_2.

Findings

The quantum operators are covariantly constant under the Hitchin-Witten connection.

The level-N Andersen-Kashaev invariant is annihilated by the non-homogeneous -polynomial.

The construction depends on a parameter in Teichmüller space but yields consistent operators.

Abstract

We provide a Geometric Quantisation formulation of the AJ-conjecture for the Teichm\"{u}ller TQFT, and we prove it in detail in the case of the knot complements of $4_{1}$ and $5_2$. The conjecture states that the level-$N$ Andersen-Kashaev invariant, $J^{(\mathrm{b},N)}_{M,K}$, is annihilated by the non-homogeneous $\hat{A}$-polynomial, evaluated at appropriate $q$-commutative operators. We obtained the latter via Geometric Quantisation on the moduli space of flat $\operatorname{SL}(2,\mathbb{C})$-connections on a genus-$1$ surface, by considering the holonomy functions associated to a meridian and longitude. The construction depends on a parameter $\sigma$ in the Teichm\"{u}ller space in a way measured by the Hitchin-Witten connection, but we show that the resulting quantum operators are covariantly constant. Their action on $J^{(\mathrm{b},N)}_{M,K}$ is then defined via a trivialisation of the Hitchin-Witten connection and the Weil-Gel'Fand-Zak transform.