Ratliff-Rush closures and linear growth of primary decompositions of ideals

Abstract

Let R be a commutative Noetherian ring, E a non-zero finitely generated R-module and I an ideal of R. One purpose of this paper is to show that the sequences RE/ IEn and RIn E/In+1E, n = 1,2, …, of associated prime ideals are increasing and eventually stabilize. This extends the main result of Mirbagheri and Ratliff [Theorem 3.1]MR. In addition, a characterization concerning the set A*(I,E) is included. A second purpose of this paper is to prove that I has linear growth primary decompositions for Ratliff-Rush closures with respect to E, that is, there exists a positive integer k such that for every positive integer n, there exists a minimal primary decomposition InE= Q1 ·s Qs in E with ((Qi:RE))nk⊂eq (Qi:R E), for all i= 1, …, s.