Hitoshi Murakami, Anh T. Tran
Published 2020-10-08Version 1
We study the asymptotic behavior of the $N$-dimensional colored Jones polynomial of a cable of the figure-eight knot, evaluated at $\exp(\xi/N)$ for a real number $\xi$. We show that if $\xi$ is sufficiently large, the colored Jones polynomial grows exponentially when $N$ goes to the infinity. Moreover the growth rate is related to the Chern-Simons invariant of the knot exterior associated with an $\mathrm{SL}(2;\mathbb{R})$ representation.
The colored Jones polynomial of the figure-eight knot and an $\operatorname{SL}(2;\mathbb{R})$-representation
The computation of the non-commutative generalization of the A-polynomial for the figure-eight knot
The $(2,1)$-cable of the figure-eight knot is not smoothly slice
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