Faltings' annihilator theorem and almost Cohen-Macaulay rings

Abstract

Faltings' annihilator theorem is an important result in local cohomology theory. Recently, Doustimehr and Naghipour generalized the Falitings' annihilator theorem. They proved that if R is a homomorphic image of a Gorenstein ring, then fab(M)n = λab(M)n, where fab(M)n := ∈f\i ∈ N dimSupp(bt Hai(M)) ≥ n for all t∈ N\ and λab(M)n := ∈f\λa Rpb Rp(Mp) p∈SpecR with dimR/p ≥ n\. In this paper, we study the relation between fab(M)n and λab(M)n, and prove that if R is an almost Cohen-Macaulay ring, then fab(M)n ≥ λab(M)n - cmdR. Using this result, we prove that if R is a homomorphic image of a Cohen-Macaulay ring, then fab(M)n = λab(M)n.