Quasi-finite modules and asymptotic prime divisors

Abstract

Let A be a Noetherian ring, J⊂eq A an ideal and C a finitely generated A-module. In this note we would like to prove the following statement. Let \In\n≥ 0 be a collection of ideals satisfying : (i) In⊃eq Jn, for all n, (ii) Js· Is ⊂eq Ir+s, for all r,s≥ 0 and (iii) In⊂eq Im, whenever m≤ n. Then A(InC/JnC) is independent of n, for n sufficiently large. Note that the set of prime ideals n≥ 1 A(InC/JnC) is finite, so the issue at hand is the realization that the primes in A(InC/JnC) do not behave periodically, as one might have expected, say if n≥ 0In were a Noetherian A-algebra generated in degrees greater than one. We also give a multigraded version of our results.