Colored Jones Polynomials and the Volume Conjecture
Abstract
Using the vertex model approach for braid representations, we compute polynomials for spin-1 placed on hyperbolic knots up to 15 crossings. These polynomials are referred to as 3-colored Jones polynomials or adjoint Jones polynomials. Training a subset of the data using a fully connected feedforward neural network, we predict the volume of the knot complement of hyperbolic knots from the adjoint Jones polynomial or its evaluations with 99.34% accuracy. A function of the adjoint Jones polynomial evaluated at the phase predicts the volume with nearly the same accuracy as the neural network. From an analysis of 2-colored and 3-colored Jones polynomials, we conjecture the best phase for -colored Jones polynomials, and use this hypothesis to motivate an improved statement of the volume conjecture. This is tested for knots for which closed form expressions for the -colored Jones polynomial are known, and we show improved convergence to the volume.
Keywords
Cite
@article{arxiv.2502.18575,
title = {Colored Jones Polynomials and the Volume Conjecture},
author = {Mark Hughes and Vishnu Jejjala and P. Ramadevi and Pratik Roy and Vivek Kumar Singh},
journal= {arXiv preprint arXiv:2502.18575},
year = {2025}
}
Comments
27 pages, 16 figures