Positive Systems of Kostant Roots

Abstract

Let g be a simple complex Lie algebra and let t ⊂ g be a toral subalgebra of g. As a t-module g decomposes as \[g = s ( ∈ R g)\] where s ⊂ g is the reductive part of a parabolic subalgebra of g and R is the Kostant root system associated to t. When t is a Cartan subalgebra of g the decomposition above is nothing but the root decomposition of g with respect to t; in general the properties of R resemble the properties of usual root systems. In this note we study the following problem: "Given a subset S ⊂ R, is there a parabolic subalgebra p of g containing M = ∈ S g and whose reductive part equals s?". Our main results is that, for a classical simple Lie algebra g and a saturated S ⊂ R, the condition (Sym·(M))s = C is necessary and sufficient for the existence of such a p. In contrast, we show that this statement is no longer true for the exceptional Lie algebras F4, E6, E7, and E8. Finally, we discuss the problem in the case when S is not saturated.