On the Vasconcelos inequality for the fiber multiplicity of modules

Abstract

Let (R,m) be a Noetherian local ring of dimension d>0 with infinite residue field. Let M be a finitely generated proper R-submodule of a free R-module F with (F/M) < ∞ and having rank r. In this article, we study the fiber multiplicity f0(M) of the module M. We prove that if (R,m) is a two dimensional Cohen-Macaulay local ring, then f0(M) br1(M)-br0(M)+ (F/M)+μ(M)-r, where bri(M) denotes the ith Buchsbaum-Rim coefficient of M.