Glorious pairs of roots and Abelian ideals of a Borel subalgebra

Abstract

Let g be a simple Lie algebra with a Borel subalgebra b. Let + be the corresponding (po)set of positive roots and θ the highest root. A pair \η,η'\⊂ + is said to be glorious, if η,η' are incomparable and η+η'=θ. Using the theory of abelian ideals of b, we (1) establish a relationship of η,η' to certain abelian ideals associated with long simple roots, (2) provide a natural bijection between the glorious pairs and the pairs of adjacent long simple roots (i.e., some edges of the Dynkin diagram), and (3) point out a simple transform connecting two glorious pairs corresponding to the incident edges in the Dynkin digram. In types DE, we prove that if \η,η'\ corresponds to the edge through the branching node of the Dynkin diagram, then the meet ηη' is the unique maximal non-commutative root. There is also an analogue of this property for all other types except type A. As an application, we describe the minimal non-abelian ideals of b.