Abelian ideals and amazing roots

Abstract

Let g be a simple Lie algebra with a Borel subalgebra b. To any long positive root γ, one associates two ideals of b: the abelian ideal I(γ)max and not necessarily abelian ideal Iγ. It is known that I(γ)max ⊂ Iγ, and γ is said to be amazing if the equality holds. The set of amazing roots, A, is closed under the operation `' in +, and γ∈ A is said to be primitive, if it cannot be written as γ1γ2 with incomparable amazing roots γ1,γ2. We classify the amazing roots and notice that the number of primitive roots equals rk( g). Moreover, if (resp. A pr) is the set of simple (resp. primitive) roots, then there is a natural bijection A pr. We also describe the set A H, where H is the Heisenberg subset of +.