Publisher's Synopsis
"Weighted projective lines, introduced by Geigle and Lenzing in 1987, are important objects in representation theory. They have tilting bundles, whose endomorphism algebras are the canonical algebras introduced by Ringel. The aim of this paper is to study their higher dimensional analogs. First, we introduce a certain class of commutative Gorenstein rings R graded by abelian groups L of rank 1, which we call Geigle-Lenzing complete intersections. We study the stable category CMLR of Cohen-Macaulay representations, which coincides with the singularity category DL sg(R). We show that CMLR is triangle equivalent to Db(modACM) for a finite dimensional algebra ACM, which we call the CM-canonical algebra. As an application, we classify the (R, L) that are Cohen-Macaulay finite. We also give sufficient conditions for (R, L) to be d-Cohen-Macaulay finite in the sense of higher Auslander-Reiten theory. Secondly, we study a new class of non-commu
