English

Multivariate Alexander colorings

Geometric Topology 2018-11-20 v4

Abstract

We extend the notion of link colorings with values in an Alexander quandle to link colorings with values in a module MM over the Laurent polynomial ring Λμ=Z[t1±1,,tμ±1]\Lambda_{\mu}=\mathbb{Z}[t_1^{\pm1},\dots,t_{\mu}^{\pm1}]. If DD is a diagram of a link LL with μ\mu components, then the colorings of DD with values in MM form a Λμ\Lambda_{\mu}-module ColorA(D,M)\mathrm{Color}_A(D,M). Extending a result of Inoue [Kodai Math.\ J.\ 33 (2010), 116-122], we show that ColorA(D,M)\mathrm{Color}_A(D,M) is isomorphic to the module of Λμ\Lambda_{\mu}-linear maps from the Alexander module of LL to MM. In particular, suppose MM is a field and φ:ΛμM\varphi:\Lambda_{\mu} \to M is a homomorphism of rings with unity. Then φ\varphi defines a Λμ\Lambda_{\mu}-module structure on MM, which we denote MφM_\varphi. We show that the dimension of ColorA(D,Mφ)\mathrm{Color}_A(D,M_\varphi) as a vector space over MM is determined by the images under φ\varphi of the elementary ideals of LL. This result applies in the special case of Fox tricolorings, which correspond to M=GF(3)M=GF(3) and φ(ti)1\varphi(t_i) \equiv-1. Examples show that even in this special case, the higher Alexander polynomials do not suffice to determine ColorA(D,Mφ)|\mathrm{Color}_A(D,M_\varphi)|; this observation corrects erroneous statements of Inoue [J. Knot Theory Ramifications 10 (2001), 813-821; op. cit.].

Keywords

Cite

@article{arxiv.1805.02189,
  title  = {Multivariate Alexander colorings},
  author = {Lorenzo Traldi},
  journal= {arXiv preprint arXiv:1805.02189},
  year   = {2018}
}

Comments

v1: 11 pages, 3 figures. v2: 13 pages, 4 figures. v3: 13 pages, 4 figures. v4: 14 pages, 4 figures. Further changes may be made before publication in the Journal of Knot Theory and its Ramifications

R2 v1 2026-06-23T01:46:18.941Z