# The Jones Polynomial and Khovanov Homology of Weaving Knots $W(3,n)$

**Authors:** Rama Mishra, Ross Staffeldt

arXiv: 1704.03982 · 2017-04-14

## TL;DR

This paper computes the signature, Jones polynomial, and Khovanov homology ranks of weaving knots W(3,n), providing recursive formulas and evidence that these ranks are asymptotically normally distributed.

## Contribution

It introduces recursive methods to compute invariants of weaving knots W(3,n) and explores the asymptotic distribution of their Khovanov homology ranks.

## Key findings

- Signature calculation for weaving knots W(k,n)
- Recursive formulas for Jones polynomial of W(3,n)
- Evidence of normal distribution in Khovanov homology ranks

## Abstract

In this paper we compute the signature for a family of knots $W(k,n)$, the weaving knots of type $(k,n)$. By work of E.~S.~Lee the signature calculation implies a vanishing theorem for the Khovanov homology of weaving knots. Specializing to knots $W(3,n)$, we develop recursion relations that enable us to compute the Jones polynomial of $W(3,n)$. Using additional results of Lee, we compute the ranks of the Khovanov Homology of these knots. At the end we provide evidence for our conjecture that, asymptotically, the ranks of Khovanov Homology of $W(3,n)$ are {\it normally distributed}.

## Full text

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## Figures

13 figures with captions in the complete paper: https://tomesphere.com/paper/1704.03982/full.md

## References

4 references — full list in the complete paper: https://tomesphere.com/paper/1704.03982/full.md

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Source: https://tomesphere.com/paper/1704.03982