Components of V() V() and dominant weight polyhedra for affine Kac-Moody Lie algebras

Abstract

Kostant asked the following question: Let g be a simple Lie algebra over the complex numbers. Let λ be a dominant integral weight. Then, V(λ) is a component of V() V() if and only if λ ≤ 2 under the usual Bruhat-Chevalley order on the set of weights. In an earlier work with R. Chirivi and A. Maffei the second author gave an affirmative answer to this question up to a saturation factor. The aim of the current work is to extend this result to untwisted affine Kac-Moody Lie algebra g associated to any simple Lie algebra g (up to a saturation factor). In fact, we prove the result for affine sln without any saturation factor. Our proof requires some additional techniques including the Goddard-Kent-Olive construction and study of the characteristic cone of non-compact polyhedra.