Cohen-Macaulayness of formal fibers and dimension of local cohomology modules

Abstract

Let (R, m ) be a Noetherian local ring, M a finitely generated R-module of dimension d. Set a(M):=a0(M)·s ad-1(M), where ai(M):= AnnRHim(M) for i≥ 0. In this paper, we study the Cohen-Macaulayness of formal fibers of R in the relation with the dimension dim (R/a(M)). We prove that dim (R/a(M))<d if and only if R/p is unmixed and the generic formal fiber of R/p is Cohen-Macaulay for all p∈ SuppR(M) with dim (R/p)=d. In general, R/p is unmixed and the generic formal fiber of R/p is Cohen-Macaulay for all p∈ SuppR(M) with dim (R/p)> dim (R/a(M)). As applications, we explore the structure of local rings and the dimension, the closedness of non Cohen-Macaulay locus of finitely generated modules.