Combinatorial and geometric constructions associated with the Kostant cascade
Abstract
Let g be a complex simple Lie algebra and b= t u+ a fixed Borel subalgebra. Let + be the set of positive roots associated with u+ and K⊂+ the Kostant cascade. We elaborate on some constructions related to K and applications of K. This includes the cascade element x K in the Cartan subalgebra t and properties of certain objects naturally associated with K: an abelian ideal of b, a nilpotent G-orbit in g, and an involution of g.
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