Abelian ideals of a Borel subalgebra and long positive roots
Abstract
Let be a Borel subalgebra of a simple Lie algebra and let denote the set of all Abelian ideals of . We consider as poset with respect to inclusion, the zero ideal being the unique minimal element of . It was shown in my paper with G.Roehrle (Adv. Math. v.159 (2001)) that there is a one-to-one correspondence between the maximal Abelian ideals and the long simple roots of . But the very existence of it was demonstrated in a case-by-case fashion. Here a conceptual explanation for that empirical observation is given. The main results are: 1) there is a natural mapping τ from the set of all nontrivial Abelian ideals to the set of long positive roots; 2) If I is a maximal Abelian ideal, then τ(I) is a long simple root. Restricting τ to the set of maximal Abelian ideals yields the above-mentioned correspondence; 3) Each fibre of τ is a poset in its own right, and we prove that this fibre has a unique maximal and a unique minimal element. 4) An explicit description of the minimal and the maximal ideal corresponding to a long root is given.
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