Quiver-graded Richardson Orbits
Abstract
In Lie theory, a dense orbit in the unipotent radical of a parabolic group under the adjoint action is called a Richardson orbit. We define a quiver-graded version of Richardson orbits generalising the classical definition in the case of the general linear group. In our setting a product of parabolic subgroups of general linear groups acts on a closed subvariety of the representation space of a quiver. Such dense orbits do not exist in general. We define a quasi-hereditary algebra called the nilpotent quiver algebra whose isomorphism classes of -filtered modules correspond to orbits in our generalised setting. We translate the existence of a Richardson orbit into the existence of a rigid -filtered module of a given dimension vector. We study an idempotent recollement of this algebra whose associated intermediate extension functor can be used to produce Richardson orbits in some situations. This can be explicitly calculated in examples. We also give examples where no Richardson orbit exists.
Cite
@article{arxiv.1707.03244,
title = {Quiver-graded Richardson Orbits},
author = {Ögmundur Eiriksson and Julia Sauter},
journal= {arXiv preprint arXiv:1707.03244},
year = {2018}
}
Comments
30 pages. Corrected some errors and added citations, revised w.r.t. spelling, grammar and readability. Geometric results of Section 3 moved to Section 4. Some examples modified, and a couple of results that were not followed upon removed