Criteria for finite injective dimension of modules over a local ring
Abstract
Let R be a commutative Noetherian local ring. We prove that the finiteness of the injective dimension of a finitely generated R-module C is determined by the existence of a Cohen--Macaulay module M that satisfies an inequality concerning multiplicity and type, together with the vanishing of finitely many Ext modules. As applications, we recover a result of Rahmani and Taherizadeh and provide sufficient conditions for a finitely generated R-module to have finite injective dimension.
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