Nilpotent subspaces and nilpotent orbits

Abstract

Let G be a semisimple algebraic group with Lie algebra g. For a nilpotent G-orbit O⊂ g, let d O denote the maximal dimension of a subspace V⊂ g that is contained in the closure of O. In this note, we prove that d O 12 O and this upper bound is attained if and only if O is a Richardson orbit. Furthermore, if V is B-stable and V= 12 O, then V is the nilradical of a polarisation of O. Every nilpotent orbit closure has a distinguished B-stable subspace constructed via an sl2-triple, which is called the Dynkin ideal. We then characterise the nilpotent orbits O such that the Dynkin ideal (1) has the minimal dimension among all B-stable subspaces c such that c O is dense in c, or (2) is the only B-stable subspace c such that c O is dense in c.