Root polytopes and abelian ideals

Abstract

We study the root polytope P of a finite irreducible crystallographic root system using its relation with the abelian ideals of a Borel subalgebra of a simple Lie algebra with root system . We determine the hyperplane arrangement corresponding to the faces of codimension 2 of P and analyze its relation with the facets of P. For of type An or Cn, we show that the orbits of some special subsets of abelian ideals under the action of the Weyl group parametrize a triangulation of P. We show that this triangulation restricts to a triangulation of the positive root polytope P+.