Faces of polytopes and Koszul algebras

Abstract

Let be a reductive Lie algebra and V a -semisimple module. In this article, we study the category of graded finite-dimensional representations of V. We produce a large class of truncated subcategories, which are directed and highest weight. Suppose V is finite-dimensional with weights (V). Let ⊂ (V) be the set of weights contained in a face of the polytope that is the convex hull of (V). For each such , we produce quasi-hereditary Koszul algebras. We use these Koszul algebras to construct an infinite-dimensional graded subalgebra of the locally finite part of the algebra of invariants (END () V), where is the direct sum of all simple finite-dimensional -modules. We prove that is Koszul of finite global dimension.