Multivariate Alexander colorings

Abstract

We extend the notion of link colorings with values in an Alexander quandle to link colorings with values in a module M over the Laurent polynomial ring μ=Z[t11,…,tμ1]. If D is a diagram of a link L with μ components, then the colorings of D with values in M form a μ-module ColorA(D,M). Extending a result of Inoue [Kodai Math.\ J.\ 33 (2010), 116-122], we show that ColorA(D,M) is isomorphic to the module of μ-linear maps from the Alexander module of L to M. In particular, suppose M is a field and :μ M is a homomorphism of rings with unity. Then defines a μ-module structure on M, which we denote M. We show that the dimension of ColorA(D,M) as a vector space over M is determined by the images under of the elementary ideals of L. This result applies in the special case of Fox tricolorings, which correspond to M=GF(3) and (ti) -1. Examples show that even in this special case, the higher Alexander polynomials do not suffice to determine |ColorA(D,M)|; this observation corrects erroneous statements of Inoue [J. Knot Theory Ramifications 10 (2001), 813-821; op. cit.].