Nilpotent subspaces and nilpotent orbits
Abstract
Let be a semisimple algebraic group with Lie algebra . For a nilpotent -orbit , let denote the maximal dimension of a subspace that is contained in the closure of . In this note, we prove that and this upper bound is attained if and only if is a Richardson orbit. Furthermore, if is -stable and , then is the nilradical of a polarisation of . Every nilpotent orbit closure has a distinguished -stable subspace constructed via an -triple, which is called the Dynkin ideal. We then characterise the nilpotent orbits such that the Dynkin ideal (1) has the minimal dimension among all -stable subspaces such that is dense in , or (2) is the only -stable subspace such that is dense in .
Cite
@article{arxiv.1601.03264,
title = {Nilpotent subspaces and nilpotent orbits},
author = {Dmitri Panyushev and Oksana Yakimova},
journal= {arXiv preprint arXiv:1601.03264},
year = {2019}
}
Comments
23 pages, to appear in the "Journal of the Australian Math. Soc."