Auslander's Theorem for dihedral actions on preprojective algebras of type A

Abstract

Given an algebra R and G a finite group of automorphisms of R, there is a natural map ηR,G:R\#G EndRG R, called the Auslander map. A theorem of Auslander shows that ηR,G is an isomorphism when R=C[V] and G is a finite group acting linearly and without reflections on the finite-dimensional vector space V. The work of Mori and Bao-He-Zhang has encouraged study of this theorem in the context of Artin-Schelter regular algebras. We initiate a study of Auslander's result in the setting of non-connected graded Calabi-Yau algebras. When R is a preprojective algebra of type A and G is a finite subgroup of Dn acting on R by automorphism, our main result shows that ηR,G is an isomorphism if and only if G does not contain all of the reflections through a vertex.