On Coefficient Module of Arbitrary Modules

Abstract

Let (R, m) be a d-dimensional Noetherian local ring that is formally equidimensional, and let M be an arbitrary R-submodule of the free module F = Rp with an analytic spread s:=s(M). In this work, inspired by Herzog-Puthenpurakal-Verma in herzog, we show the existence of an unique largest R-module Mk with R(Mk/M)<∞ and M⊂eq Ms⊂eq·s⊂eq M1⊂eq M0⊂eq q(M), such that (PMk/M(n))<s-k, where q(M) is the relative integral closure of M, defined by q(M):=M Msat, where Msat=n≥ 1(M:Fmn) is the saturation of M. We also provide a structure theorem for these modules. Furthermore, we establish the existence of coefficient modules between I(M)M and M, where I(M) denotes the 0-th Fitting ideal of F/M, and discuss their structural properties. Finally, we present some applications and discuss some properties.