On a class of power ideals

Abstract

In this paper we study the class of power ideals generated by the kn forms (x0+g1x1+…+gnxn)(k-1)d where is a fixed primitive kth-root of unity and 0≤ gj≤ k-1 for all j. For k=2, by using a Zkn+1-grading on C[x0,…,xn], we compute the Hilbert series of the associated quotient rings via a simple numerical algorithm. We also conjecture the extension for k>2. Via Macaulay duality, those power ideals are related to schemes of fat points with support on the kn points [1:g1:…:gn] in Pn. We compute Hilbert series, Betti numbers and Gr\"obner basis for such 0-dimensional schemes. This explicitly determines the Hilbert series of the power ideal for all k: that this agrees with our conjecture for k>2 is supported by several computer experiments.