Bass and Betti Numbers of A/In.

Abstract

Let (A, , k) be a Gorenstein local ring of dimension d≥ 1. Let I be an ideal of A with (I) ≥ d-1. We prove that the numerical function \[ n (Ai(k, A/In+1))\] is given by a polynomial of degree d-1 in the case when i ≥ d+1 and (In) > 1 for all n ≥ 1. We prove a similar result for the numerical function \[ n (iA(k, A/In+1))\] under the assumption that A is a ~ local ring. We note that there are many examples of ideals satisfying the condition (In) > 1, for all n ≥ 1. We also consider more general functions n (iA(M, A/In) for a filtration \In \ of ideals in A. We prove similar results in the case when M is a maximal ~ A-module and \In=In \ is the integral closure filtration, I an -primary ideal in A.