Electronic Only Electronic Research Announcements
Representation Theory
ISSN 1088-4165
Previous volume | Table of contents | Next volume
Articles in press | Most recent volume | All volumes
Next Article
     

Nilpotent orbits and theta-stable parabolic subalgebras

Author(s): Alfred G. Noël
Journal: Represent. Theory 2 (1998), 1-32.
MSC (1991): Primary 17B20, 17B70
Posted: February 3, 1998
Retrieve article in: PDF DVI PostScript
This article is available free of charge

Abstract | References | Similar articles | Additional information

Abstract: In this work, we present a new classification of nilpotent orbits in a real reductive Lie algebra ${\mathfrak{g}}$ under the action of its adjoint group. Our classification generalizes the Bala-Carter classification of the nilpotent orbits of complex semisimple Lie algebras. Our theory takes full advantage of the work of Kostant and Rallis on ${\mathfrak{p}}_{{}_{\mathbb{C}}}$, the ``complex symmetric space associated with ${\mathfrak{g}}$''. The Kostant-Sekiguchi correspondence, a bijection between nilpotent orbits in ${\mathfrak{g}}$ and nilpotent orbits in ${\mathfrak{p}}_{{}_{\mathbb{C}}}$, is also used. We identify a fundamental set of noticed nilpotents in ${\mathfrak{p}}_{{}_{\mathbb{C}}}$ and show that they allow us to recover all other nilpotents. Finally, we study the behaviour of a principal orbit, that is an orbit of maximal dimension, under our classification. This is not done in the other classification schemes currently available in the literature.

References:

[B-C1]
P. Bala and R. Carter, Classes of unipotent elements in simple algebraic groups. I, Math. Proc. Cambridge. Philos. Soc. 79 (1976), 401-425. MR 54:5363a

[B-C2]
P. Bala and R. Carter, Classes of unipotent elements in simple algebraic groups. II, Math. Proc. Cambridge. Philos. Soc. 80 (1976), 1-17. MR 54:5363b

[Bo]
A. Borel and J. Tits, Groupes réductifs, Inst. Hautes Etudes Sci. Publ. Math. 27 (1965), 55-150. MR 34:7527

[B-Cu]
N. Burgoyne and R. Cushman, Conjugacy classes in the linear groups, J. Alg. 44 (1977), 339-362. MR 55:5761

[Br]
W. C. Brown, A second course in linear algebra, John Wiley & Sons, Interscience, 1988. MR 89f:15001

[Ca]
R. Carter, Finite groups of Lie type. Conjugacy classes and complex characters, John Wiley & Sons, London, 1985. MR 94k:20020

[C-Mc]
D. H. Collingwood and W. M. McGovern, Nilpotent orbits in semisimple Lie algebras, Van Nostrand Reihnhold Mathematics Series, New York, 1993. MR 94j:17001

[D1]
D. Djokovic, Classification of nilpotent elements in simple exceptional real Lie algebras of inner type and description of their centralizers, J. Alg. 112 (1988), 503-524. MR 89b:17010

[D2]
D. Djokovic, Classification of nilpotent elements in the simple real Lie algebras $E_{6(6)}$ and $E_{6(-26)}$ and description of their centralizers, J. Alg. 116 (1988), 196-207. MR 89k:17022

[D3]
D. Djokovic, Closures of conjugacy classes in classical real linear Lie groups, Algebra, Carbondale, Lecture Notes in Math. 848, Springer-Verlag, New York (1980), 63-83. MR 82h:20052

[Dy]
E. Dynkin, Semisimple subalgebras of simple Lie algebras, Amer. Soc. Transl. Ser. 2 6, (1957), 111-245.

[He]
S. Helgason, Differential geometry, Lie groups, and symmetric spaces, Academic Press, New York, 1978. MR 80k:53081

[H1]
J. Humphreys, Introduction to Lie algebras and representation theory, Graduate Texts in Mathematics, vol. 9, Springer-Verlag, New York, 1972. MR 81b:17007

[H2]
J. Humphreys, Conjugacy classes in semisimple algebraic groups, Mathematical Surveys and Monographs, vol. 43, Amer. Math. Soc., Providence RI, 1995. MR 97i:20057

[Hu]
T. W. Hungerford, Algebra, Graduate Texts in Mathematics, vol. 73, Springer-Verlag, New York, 1974. MR 82a:00006

[J-R]
D. S. Johnston and R. W. Richardson, Conjugacy classes in parabolic subgroups of semisimple algebraic groups. II, Bull. London Math. Soc. 9 (1977), 245-250. MR 58:917

[Ka]
N. Kawanaka, Orbits and stabilizers of nilpotent elements of a graded semisimple Lie algebra, J. Fac. Univ. Tokyo Sect. IA, Math 34 (1987), 573-597. MR 89j:17012

[Ki]
D. R. King, The component groups of nilpotents in exceptional simple real Lie algebras, Comm. Algebra 20 (1) (1992), 219-284. MR 93c:17018

[Kn]
A. W. Knapp, Lie groups beyond an introduction, vol. 140, Birkhäuser, Progress in Mathematics, Boston, 1996. CMP 96:15

[K-V]
A. W. Knapp and D. A. Vogan, Cohomological induction and unitary representations, vol. 45, Princeton, New Jersey, 1995. MR 96c:22023

[Ko]
B. Kostant, The principal three-dimensional subgroup and the Betti numbers of a complex simple Lie group, Amer. J. Math. 81 (1959), 973-1032. MR 22:5693

[K-R]
B. Kostant and S. Rallis, Orbits and representations associated with symmetric spaces, Amer. J. Math. 93 (1971), 753-809. MR 47:399

[No1]
A. G. Noël, Classification of nilpotent orbits in symmetric spaces, Proceedings of the DIMACS workshop for African-American Researchers in the Mathematical Sciences, Amer. Math. Soc. 34 (1997).

[No2]
A. G. Noël, Nilpotent orbits and $\theta $-stable parabolic subalgebras, Ph.D. Thesis, Northeastern University, Boston (March 1997).

[R]
R. W. Richardson, Conjugacy classes in Lie algebras and algebraic groups, Ann. Math. 86 (1967), 1-15. MR 36:173

[R1]
R. W. Richardson, On orbits of algebraic groups and Lie groups, Bull. Austral. Math. Soc. 25 (1982), 1-28. MR 83i:14041

[R2]
R. W. Richardson, Finiteness theorems for orbits of algebraic groups, Indag. Math. 47 (1985), 337-344. MR 87e:14044

[Röh]
G. Röhrle, On certain stabilizers in algebraic groups, Comm. Algebra 21 (5) (1993), 1631-1644. MR 94d:20052

[Rot]
L. P. Rothschild, Orbits in a real reductive Lie algebra, Trans. Amer. Math. Soc. 168 (June 1972), 403-421. MR 50:2271

[S-K]
M. Sato and T. Kimura, A classification of irreducible prehomogeneous vector spaces and their relative invariants, Nagoya Math. J. 65 (1977), 1-155. MR 55:3341

[Se]
J. Sekiguchi, Remarks on real nilpotent orbits of a symmetric pair, J. Math. Soc. Japan 39, No. 1 (1987), 127-138. MR 88g:53053

[S-S]
T. A. Springer and R. Steinberg, Seminar on algebraic groups and related finite groups, Lecture Notes in Mathematics 131 (1970). MR 42:3091

[Ve]
M. Vergne, Instantons et correspondence de Kostant-Sekiguchi, R. Acad. Sci. Paris Sér. I Math. 320 (1995), 901-906. MR 96c:22026

[Vi]
E. B. Vinberg, On the classification of the nilpotent elements of graded Lie algebras, Soviet Math. Dokl. 16 (1975), 1517-1520.

[Vo]
D. A. Vogan, Representation of real reductive Lie groups, vol. 15, Birkhäuser, Progress in Mathematics, Boston, 1981. MR 83c:22022

Similar Articles:

Retrieve articles in Representation Theory with MSC (1991): 17B20, 17B70

Retrieve articles in all Journals with MSC (1991): 17B20, 17B70

Additional Information:

Alfred G. Noël
Affiliation: Department of Mathematics, Northeastern University, Boston, Massachusetts, 02115 - Peritus Software Services Inc. 304 Concord Road, Billerica, Massachusetts 01821
Email: anoel@lynx.neu.edu, anoel@peritus.com

DOI: 10.1090/S1088-4165-98-00038-7
PII: S 1088-4165(98)00038-7
Keywords: Parabolic subalgebras, nilpotent orbits, reductive Lie algebras
Received by editor(s): August 11, 1997
Received by editor(s) in revised form: December 3, 1997
Posted: February 3, 1998
Additional Notes: The author thanks his advisor, Donald R. King, for his helpful suggestions.
Copyright of article: Copyright 1998, American Mathematical Society

  AMS Website Logo Small Comments: webmaster@ams.org
© Copyright 2008, American Mathematical Society
Privacy Statement 		Search the AMSPowered by Google