Asymptotic depth of Ext modules over complete intersection rings

Abstract

Let (A,m) be a local complete intersection ring and let I be an ideal in A. Let M, N be finitely generated A-modules. Then for l = 0,1, the values depth \ Ext2i+lA(M, N/InN) become independent of i, n for i,n 0. We also show that if p is a prime ideal in A then the jth Bass numbers μj(p,\ Ext2i+lA(M,N/InN)) has polynomial growth in (n,i) with rational coefficients for all sufficiently large (n,i).