Maximal eigenvalues of a Casimir operator and multiplicity-free modules

Abstract

Let be a finite-dimensional complex semisimple Lie algebra and a Borel subalgebra. Then acts on its exterior algebra naturally. We prove that the maximal eigenvalue of the Casimir operator on is one third of the dimension of , that the maximal eigenvalue mi of the Casimir operator on i is increasing for 0 i r, where r is the number of positive roots, and that the corresponding eigenspace Mi is a multiplicity-free -module whose highest weight vectors corresponding to certain ad-nilpotent ideals of . We also obtain a result describing the set of weights of the irreducible representation of with highest weight a multiple of , where is one half the sum of positive roots.