Vertices of Intersection Polytopes and Rays of Generalized Kostka Cones

Abstract

Let K(G) be the rational cone generated by pairs (λ, μ) where λ and μ are dominant integral weights and μ is a nontrivial weight space in the representation Vλ of G. We produce all extremal rays of K(G) by considering the vertices of corresponding intersection polytopes IPλ, the set of points in K(G) with first coordinate λ. We show that vertices of IP_i arise as lifts of vertices coming from cones K(L) associated to simple Levi subgroups possessing the simple root αi. As corollaries we obtain a complete description of all extremal rays, as well as polynomial formulas describing the numbers of extremal rays depending on type and rank.