MOP---algorithmic modality analysis for parabolic group actions
MOP---algorithmic modality analysis for parabolic group actions
Let G be a simple algebraic group and P a parabolic subgroup of G. The group P acts on the Lie algebra $\mathfrak p_u$ of its unipotent radical $ P_u$ via the adjoint action. The modality of this action, mod ($P : \mathfrak p_u)$, is the maximal number of parameters upon which a family of P-orbits on $\mathfrak p_u$ depends. More generally, we also consider the modality of the action of P on an invariant subspace $\mathfrak n$ of $\mathfrak p_u$, that is mod ($P :\mathfrak n)$. In this note we describe an algorithmic procedure, called MOP, which allows one to determine upper bounds for mod ($P :\mathfrak n)$.
The classification of the parabolic subgroups P of exceptional groups with a finite number of orbits on $\mathfrak p_u$ was achieved with the aid of MOP. We describe the results of this classification in detail in this paper. In view of the results from Hille and Röhrle (1999), this completes the classification of parabolic subgroups of all reductive algebraic groups with this finiteness property.
Besides this result we present other applications of MOP, and illustrate an example.
linear algebraic groups, lie algebras, modality of parabolic groups
57-67
Juergens, Ulf
e9b6e040-a96c-4ce5-acee-a9061fd15980
Roehrle, Gerhard
85f9d4eb-d522-4a95-bde9-300e8e3e7886
2002
Juergens, Ulf
e9b6e040-a96c-4ce5-acee-a9061fd15980
Roehrle, Gerhard
85f9d4eb-d522-4a95-bde9-300e8e3e7886
Juergens, Ulf and Roehrle, Gerhard
(2002)
MOP---algorithmic modality analysis for parabolic group actions.
Experimental Mathematics, 11 (2), .
Abstract
Let G be a simple algebraic group and P a parabolic subgroup of G. The group P acts on the Lie algebra $\mathfrak p_u$ of its unipotent radical $ P_u$ via the adjoint action. The modality of this action, mod ($P : \mathfrak p_u)$, is the maximal number of parameters upon which a family of P-orbits on $\mathfrak p_u$ depends. More generally, we also consider the modality of the action of P on an invariant subspace $\mathfrak n$ of $\mathfrak p_u$, that is mod ($P :\mathfrak n)$. In this note we describe an algorithmic procedure, called MOP, which allows one to determine upper bounds for mod ($P :\mathfrak n)$.
The classification of the parabolic subgroups P of exceptional groups with a finite number of orbits on $\mathfrak p_u$ was achieved with the aid of MOP. We describe the results of this classification in detail in this paper. In view of the results from Hille and Röhrle (1999), this completes the classification of parabolic subgroups of all reductive algebraic groups with this finiteness property.
Besides this result we present other applications of MOP, and illustrate an example.
This record has no associated files available for download.
More information
Published date: 2002
Keywords:
linear algebraic groups, lie algebras, modality of parabolic groups
Identifiers
Local EPrints ID: 39028
URI: http://eprints.soton.ac.uk/id/eprint/39028
ISSN: 1058-6458
PURE UUID: adb9df1a-b35c-40a4-b60f-7765dab69a4c
Catalogue record
Date deposited: 16 Jun 2006
Last modified: 08 Jan 2022 18:57
Export record
Contributors
Author:
Ulf Juergens
Author:
Gerhard Roehrle
Download statistics
Downloads from ePrints over the past year. Other digital versions may also be available to download e.g. from the publisher's website.
View more statistics