Arithmetic Kei Theory
Number Theory
2024-08-14 v2 Geometric Topology
Abstract
A kei, or 2-quandle, is an algebraic structure one can use to produce a numerical invariant of links, known as coloring invariants. Motivated by Mazur's analogy between prime numbers and knots, we define for every finite kei an analogous coloring invariant of square-free integers. This is achieved by defining a fundamental kei for every such . We conjecture that the asymptotic average order of can be predicted to some extent by the colorings of random braid closures. This conjecture is fleshed out in general, building on previous work, and then proven for several cases.
Cite
@article{arxiv.2408.05489,
title = {Arithmetic Kei Theory},
author = {Ariel Davis and Tomer M Schlank},
journal= {arXiv preprint arXiv:2408.05489},
year = {2024}
}
Comments
typo corrections