Quivers with relations arising from Koszul algebras of g-invariants

Abstract

Let g be a complex simple Lie algebra and let be an extremal set of positive roots. One associates with an infinite dimensional Koszul algebra S g which is a graded subalgebra of the locally finite part of (( V)op S( g)) g, where V is the direct sum of all simple finite dimensional g-modules. We describe the structure of the algebra S g explicitly in terms of an infinite quiver with relations for g of types A and C. We also describe several infinite families of quivers and finite dimensional algebras arising from this construction.