English

Linking numbers, quandles and groups

Geometric Topology 2021-10-05 v3

Abstract

We introduce a quandle invariant of classical and virtual links, denoted Qtc(L)Q_{tc} (L). This quandle has the property that Qtc(L)Qtc(L)Q_{tc} (L) \cong Q_{tc} (L') if and only if the components of LL and LL' can be indexed in such a way that L=K1KμL=K_1 \cup \dots \cup K_{\mu}, L=K1KμL'=K'_1 \cup \dots \cup K'_{\mu} and for each index ii, there is a multiplier ϵi{1,1}\epsilon_i \in \{-1,1\} that connects virtual linking numbers over KiK_i in LL to virtual linking numbers over KiK'_i in LL': j/i(Ki,Kj)=ϵij/i(Ki,Kj)\ell_{j/i}(K_i,K_j)= \epsilon_i \ell_{j/i}(K'_i,K'_j) for all jij \neq i. We also extend to virtual links a classical theorem of Chen, which relates linking numbers to the nilpotent quotient G(L)/G(L)3G(L)/G(L)_3.

Keywords

Cite

@article{arxiv.2102.11610,
  title  = {Linking numbers, quandles and groups},
  author = {Lorenzo Traldi},
  journal= {arXiv preprint arXiv:2102.11610},
  year   = {2021}
}

Comments

v1: 15 pages, 4 figures. v2: minor improvements. v3: final prepublication version. Further changes may be made before publication in the Journal of Knot Theory and its Ramifications

R2 v1 2026-06-23T23:26:04.637Z