Casimir elements associated with Levi subalgebras of simple Lie algebras and their applications

Abstract

Let g be a simple Lie algebra, h a Levi subalgebra, and C h∈ U( h) the Casimir element defined via the restriction of the Killing form on g to h. We study C h-eigenvalues in g/ h and related h-modules. Without loss of generality, one may assume that h is a maximal Levi. Then g is equipped with the natural Z-grading g=i∈ Z g(i) such that g(0)= h and g(i) is a simple h-module for i 0. We give explicit formulae for the C h-eigenvalues in each g(i), i 0, and relate eigenvalues of C h in g(1) to the dimensions of abelian subspaces of g(1). We also prove that if a⊂ g(1) is abelian, whereas g(1) is not, then a g(1)/2. Moreover, if a=( g(1))/2, then a has an abelian complement. The Z-gradings of height 2 are closely related to involutions of g, and we provide a connection of our theory to (an extension of) the "strange formula" of Freudenthal-de Vries.