On the topological type of a set of plane valuations with symmetries

Abstract

Let \Ci : i=1,…,r\ be a set of irreducible plane curve singularities. For an action of a finite group G, let L(\ta i\) be the Alexander polynomial in r G variables of the algebraic link (i=1ra∈ Ga Ci ) S3 and let ζ(t1,…, tr) = L(t1,…,t1,t2,…,t2, …,tr,…,tr) with G identical variables in each group. (If r=1, ζ(t) is the monodromy zeta function of the function germ Πa∈ G a*f, where f=0 is an equation defining the curve C1.) We prove that ζ(t1,…, tr) determines the topological type of the link L. We prove an analogous statement for plane divisorial valuations formulated in terms of the Poincar\'e series of a set of valuations.