On the Positivity Conjecture for Finite Abelian p-Groups

Abstract

For a partition λ = (λ1 1>λ2 2>λ3 3>…>λk k) and its associated finite R-module Aλ=i=1k (R/πλiR)i, where R is a discrete valuation ring, with maximal ideal generated by a uniformizing element π, having finite residue field k=R/πR Fq, the number of orbits of pairs nλ(q)= Gλ (Aλ× Aλ) for the diagonal action of the automorphism group Gλ= Aut(Aλ), is a polynomial in q with integer coefficients. Positivity conjecture states that these coefficients are in fact non-negative. In this article, we prove this conjecture.