An equivariant Poincar\'e series of filtrations and monodromy zeta functions

Abstract

We define a new equivariant (with respect to a finite group G action) version of the Poincar\'e series of a multi-index filtration as an element of the power series ring A(G)[[t1, …, tr]] for a certain modification A(G) of the Burnside ring of the group G. We give a formula for this Poincar\'e series of a collection of plane valuations in terms of a G-resolution of the collection. We show that, for filtrations on the ring of germs of functions in two variables defined by the curve valuations corresponding to the irreducible components of a plane curve singularity defined by a G-invariant function germ, in the majority of cases this equivariant Poincar\'e series determines the corresponding equivariant monodromy zeta functions defined earlier.