Preprojective algebra structure on skew-group algebras

Abstract

We give a class of finite subgroups G<SL(n, k) for which the skew-group algebra k[x1,…, xn]\#G does not admit the grading structure of a higher preprojective algebra. Namely, we prove that if a finite group G<SL(n, k) is conjugate to a finite subgroup of SL(n1, k)× SL(n2, k), for some n1, n2≥ 1, then the skew-group algebra k[x1,…,xn]\#G is not Morita equivalent to a higher preprojective algebra. This is related to the preprojective algebra structure on the tensor product of two Koszul bimodule Calabi-Yau algebras. We prove that such an algebra cannot be endowed with a grading structure as required for a higher preprojective algebra. Moreover, we construct explicitly the bound quiver of the higher preprojective algebra over a finite-dimensional Koszul algebra of finite global dimension. We show in addition that preprojective algebras over higher representation-infinite Koszul algebras are derivation-quotient algebras whose relations are given by a superpotential.