G-semisimple algebras

Abstract

Let be an Artin algebra and mod- (Gprj-) the category of finitely presented functors over the stable category Gprj- of finitely generated Gorenstein projective -modules. This paper deals with those algebras in which mod- (Gprj-) is a semisimple abelian category, and we call G-semisimple algebras. We study some basic properties of such algebras. In particular, it will be observed that the class of G-semisimple algebras contains important classes of algebras, including gentle algebras and more generally quadratic monomial algebras. Next, we construct an epivalence from the stable category of Gorenstein projective representations Gprj(Q, ) of a finite acyclic quiver Q to the category of representations rep(Q, Gprj- ) over Gprj- ), provided is a G-semisimple algebra over an algebraic closed field. Using this, we will show that the path algebra of the G-semisimple algebra is Cohen-Macaulay finite if and only if Q is Dynkin. In the last part, we provide a complete classification of indecomposable Gorenstein projective representations within Gprj(An, ) of the linear quiver An over a G-semisimple algebra . We also determine almost split sequences in Gprj(An, ) with certain ending terms. We apply these results to obtain insights into the cardinality of the components of the stable Auslander-Reiten quiver Gprj(An, ).