Auslander-Reiten's Cohen-Macaulay algebras and contracted preprojective algebras

Abstract

Auslander and Reiten called a finite dimensional algebra A over a field Cohen-Macaulay if there is an A-bimodule W which gives an equivalence between the category of finitely generated A-modules of finite projective dimension and the category of finitely generated A-modules of finite injective dimension. For example, Iwanaga-Gorenstein algebras and algebras with finitistic dimension zero on both sides are Cohen-Macaulay, and tensor products of Cohen-Macaulay algebras are again Cohen-Macaulay. They seem to be all of the known examples of Cohen-Macaulay algebras. In this paper, we give the first non-trivial class of Cohen-Macaulay algebras by showing that all contracted preprojective algebras of Dynkin type are Cohen-Macaulay. As a consequence, for each simple singularity R and a maximal Cohen-Macaulay R-module M, the stable endomorphism algebra EndR(M) is Cohen-Macaulay. We also give a negative answer to a question of Auslander-Reiten asking whether the category CM A of Cohen-Macaulay A-modules coincides with the category of d-th syzygies, where d1 is the injective dimension of W. In fact, if A is a Cohen-Macaulay algebra that is additionally d-Gorenstein in the sense of Auslander, then CM A always coincides with the category of d-th syzygies.