Coadjoint orbits of reductive type of seaweed Lie algebras

Authors :: Moreau, Anne
Yakimova, Oksana
Laboratoire de Mathématiques et Applications (LMA-Poitiers)
Université de Poitiers-Centre National de la Recherche Scientifique (CNRS)
Department Mathematik [Erlangen]
Friedrich-Alexander Universität Erlangen-Nürnberg (FAU)
Source :: International Mathematics Research Notices, International Mathematics Research Notices, Oxford University Press (OUP), 2011, 45 p. ⟨10.1093/imrn/rnr184⟩
Publication Year :: 2011
Publisher :: arXiv, 2011.
Abstract: A connected algebraic group Q defined over a field of characteristic zero is quasi-reductive if there is an element of its dual of reductive type, that is such that the quotient of its stabiliser by the centre of Q is a reductive subgroup of GL(q), where q=Lie(Q). Due to results of M. Duflo, coadjoint representation of a quasi-reductive Q possesses a so called maximal reductive stabiliser and knowing this subgroup, defined up to a conjugation in Q, one can describe all coadjoint orbits of reductive type. In this paper, we consider quasi-reductive parabolic subalgebras of simple complex Lie algebras as well as all seaweed subalgebras of gl(n) and describe the classes of their maximal reductive stabilisers.<br />Comment: 35 pages, 5 figures; International Mathematics Research Notices (2011) 45 pages

Subjects :: Quasi-reductive Lie algebras
14L30
22D10
17B45
22E46
Regular linear forms
[MATH.MATH-RT]Mathematics [math]/Representation Theory [math.RT]
Stabilisers
FOS: Mathematics
Lie algebras of seaweed type
Representation Theory (math.RT)
Mathematics::Representation Theory
Mathematics - Representation Theory

ISSN :: 10737928 and 16870247
Database :: OpenAIRE
Journal :: International Mathematics Research Notices, International Mathematics Research Notices, Oxford University Press (OUP), 2011, 45 p. ⟨10.1093/imrn/rnr184⟩
Accession number :: edsair.doi.dedup.....a6705351380f4dea4a29d29c78811e18
Full Text :: https://doi.org/10.48550/arxiv.1101.0902