Homological behavior of Auslander's k-Gorenstein rings

Abstract

In this paper we mainly study the homological properties of dual modules over k-Gorenstein rings. For a right quasi k-Gorenstein ring , we show that the right self-injective dimension of is at most k if and only if each M ∈mod satisfying the condition that Exti(M, )=0 for any 1≤ i ≤ k is reflexive. For an ∞-Gorenstein ring, we show that the big and small finitistic dimensions and the self-injective dimension of are identical. In addition, we show that if is a left quasi ∞-Gorenstein ring and M∈mod with gradeM finite, then Exti(Ext opi(Ext gradeM(M, ), ), )=0 if and only if i≠gradeM. For a 2-Gorenstein ring , we show that a non-zero proper left ideal I of is reflexive if and only if /I has no non-zero pseudo-null submodule.

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