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Amir Mafi

Amir Mafi

Academic rank: Professor
ORCID:
Education: PhD.
ScopusId: 14627657300
HIndex:
Faculty: Faculty of Science
Address:
Phone: 33624133

Research

Title
Some homological properties of Artinian modules
Type
FinishedProject
Keywords
Artinian module
Year
2007
Researchers Amir Mafi

Abstract

In this paper we show that if (R,m) is a commutative Gorenstein local ring with maximal ideal m andM is an Artinian R-module, then depth(R) = Width(M)+ sup{i 2 N0 : Exti R(E(R/m),M) 6= 0}. Also, we prove that the following statements are equivalent: (1) R is Gorenstein. (2) R is Cohen-Macaulay and for any Artinian module M, fd(E(M))  fd(M), where E(M) is an injective envelope of M. (3) R is Cohen-Macaulay and for any finite length module M of finite injective dimension, id(F(M)) = id(M), where F(M) is a flat cover of M.