On a generalization of two results of Happel to commutative rings

Abstract

In this paper we extend two results of Happel to commutative rings. Let (A, m) be a commutative Noetherian local ring. Let Dbf(mod \ A) be the bounded derived category of complexes of finitely generated modules over A with finite length cohomology. We show Dbf( mod \ A) has Auslander-Reiten(AR)-triangles if and only if A is regular. Let Kbf(proj \ A) be the homotopy category of finite complexes of finitely generated free A-modules with finite length cohomology. We show that if A is complete and if A is Gorenstein then Kbf( proj \ A) has AR triangles. Conversely we show that if Kbf(proj \ A) has AR triangles and if A is Cohen-Macaulay or if A = 1 then A is Gorenstein.