On adjoint orbits in nilpotent ideals of a Borel subalgebra
Abstract
Let m be a nilpotent ideal in the Borel subalgebra b of a complex finite-dimensional semisimple Lie algebra, and m the subset of (ad-)nilpotent elements in b such that m is the minimal ideal containing them. This set is stable under the adjoint action of the corresponding Borel subgroup B. We prove that m contains a unique closed B-orbit which is the orbit of a nilpotent element whose support is the set of minimal roots associated to the root space decomposition of m.
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