Ample Group Action on AS-regular Algebras and Noncommutative Graded Isolated Singularities

Abstract

In this paper, we introduce a notion of ampleness of a group action G on a right noetherian graded algebra A, and show that it is strongly related to the notion of AG to be a graded isolated singularity introduced by the second author of this paper. Moreover, if S is a noetherian AS-regular algebra and G is a finite ample group acting on S, then we will show that Db(tails SG) Db(mod ∇ S*G) where ∇ S is the Beilinson algebra of S. We will also explicitly calculate a quiver QS, G such that Db(tails SG) Db(mod kQS, G) when S is of dimension 2.