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Differential operators on some nilpotent orbits

Author(s): T. Levasseur; J. T. Stafford
Journal: Represent. Theory 3 (1999), 457-473.
MSC (1991): Primary 14L30, 16S32, 17B20, 58F06
Posted: December 3, 1999
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Abstract: In recent work, Astashkevich and Brylinski construct some differential operators of Euler degree $-1$ (thus, they lower the degree of polynomials by one) on the coordinate ring $\mathcal{O}({\mathbb O}_{\min}(\mathfrak{g}))$ of the minimal nilpotent orbit $\mathbb O_{\min}(\mathfrak{g})$ for any classical, complex simple Lie algebra $\mathfrak{g}$. They term these operators ``exotic'' since there is ``(apparently) no geometric or algebraic theory that explains them''.

In this paper, we provide just such an algebraic theory for ${\mathfrak{sl}}(n)$ by giving a complete description of the ring of differential operators on $\mathbb O_{\min}({\mathfrak{sl}}(n)).$ The method of proof also works for various related varieties, notably for the Lagrangian submanifolds of the minimal orbit of classical Lie algebras for which Kostant and Brylinski have constructed exotic differential operators.

References:

1.
A. Astashkevich and R. Brylinski, Exotic Differential Operators on Complex Minimal Nilpotent Orbits, \underline{in} ``Advances in Geometry'', (Progress in Math., Vol. 172), Birkhäuser, Boston, 1998. CMP 99:07

2.
J.-E. Björk, The Auslander condition on Noetherian rings, \underline{in} ``Séminaire d'Algèbre P. Dubreil et M.-P. Malliavin'' (Lecture Notes in Math. No. 1404), Springer-Verlag, Berlin/New York, 1989. MR 90m:16002

3.
W. Borho and H. Kraft, Über die Gelfand-Kirillov Dimension, Math. Annalen, 220 (1976), 1-24. MR 54:367

4.
J.-F. Boutot, Singularités rationnelles et quotients par les groupes réductifs, Inventiones Math., 88 (1987), 65-68. MR 88a:14005

5.
W. Bruns and J. Herzog, Cohen-Macaulay rings, Cambridge Univ. Press, Cambridge, 1996. MR 95h:13020

6.
R. Brylinski and B. Kostant, Minimal representations of $E_6$, $E_7$ and $E_8$ and the generalized Capelli identity, Proc. Nat. Acad. Sci. USA, 91 (1994), 2469-2472. MR 96a:22026

7.
-, Minimal representations, geometric quantization and unitarity, Proc. Nat. Acad. Sci. USA, 91 (1994), 6026-6029. MR 95d:58059

8.
-, Nilpotent orbits, normality and Hamiltonian group actions, J. Amer. Math. Soc., 7 (1994), 269-298. MR 94g:22031

9.
-, Differential Operators on conical Lagrangian manifolds, \underline{in} ``Lie Theory and Geometry: in Honor of B. Kostant'', (Progress in Math., Vol. 123), Birkhäuser, Boston, 1994. MR 96h:58076

10.
-, Lagrangian models of minimal representations of $E_6$, $E_7$ and $E_8$, \underline{in} ``Functional Analysis on the Eve of the $21$st Century: in Honor of I. M. Gelfand'', (Progress in Math., Vol. 131), Birkhäuser, Boston, 1995. MR 96m:22025

11.
D. Garfinkle, A new construction of the Joseph ideal, Ph. D. Thesis, M.I.T., 1982.

12.
S. Helgason, Differential Geometry, Lie Groups and Symmetric Spaces, Academic Press, New York, 1978. MR 80k:53081

13.
Y. Ishibashi, Nakai's conjecture for invariant subrings, Hiroshima Math. J., 15 (1985), 429-436. MR 87b:13003

14.
G. Kempf, On the collapsing of homogeneous bundles, Inventiones Math., 37 (1976), 229-239. MR 54:12799

15.
G. R. Krause and T. H. Lenagan, Growth of Algebras and Gelfand-Kirillov Dimension, Pitman, Boston 1985. MR 86g:16001

16.
H. Kraft, Geometrische Methoden in der Invarianttentheorie, Vieweg, 1984. MR 86j:14006

17.
H. Kraft and C. Procesi, Closures of conjugacy classes of matrices are normal, Inventiones Math., 53 (1979), 227-247. MR 80m:1403

18.
-, On the geometry of conjugacy classes in classical groups, Comment. Math. Helv., 57 (1982), 539-602. MR 85b:14065

19.
T. Levasseur, Anneaux d'opérateurs differentiels \underline{in} ``Séminaire d'Algèbre P. Dubreil et M.-P. Malliavin'' (Lecture Notes in Math. No. 867), Springer-Verlag, Berlin/New York, 1981. MR 84j:32009

20.
-, Grade des modules sur certains anneaux filtrés, Comm. in Algebra, 9 (15) (1981), 1519-1532. MR 83k:13006

21.
-, La dimension de Krull de $U(sl(3))$, J. Algebra, 102 (1986), 39-59. MR 87m:17019

22.
-, Relèvements d'opérateurs différentiels sur les anneaux d'invariants \underline{in} ``Colloque en l'honneur de J. Dixmier'' (Progress in Math., Vol. 92), Birkhäuser, Boston, 1990. MR 92f:16033

23.
T. Levasseur, S. P. Smith and J. T. Stafford, The minimal nilpotent orbit, the Joseph ideal and differential operators, J. Algebra, 116 (1988), 480-501. MR 89k:17028

24.
T. Levasseur and J. T. Stafford, Rings of Differential Operators on Classical Rings of Invariants, Mem. Amer. Math. Soc. 81, No. 412, 1989. MR 90i:17018

25.
M. Lorenz, Gelfand-Kirillov Dimension, Cuadernos de Algebra, No. 7 (Grenada, Spain), 1988.

26.
I. M. Musson, Rings of differential operators on invariant rings of tori, Trans. Amer. Math. Soc., 303 (1987), 805-827. MR 88m:32019

27.
D. I. Panyushev, Rationality of singularities and the Gorenstein property for nilpotent orbits, Funct. Anal. Appl., 25 (1991), 225-226. MR 92i:14047

28.
V. L. Popov and E. B. Vinberg, Invariant Theory, \underline{in} ``Algebraic Geometry IV'', (Eds: A. N. Parshin and I. R. Shafarevich), Springer-Verlag, Berlin/Heidelberg/New York, 1991.

29.
G. W. Schwarz, Lifting differential operators from orbit spaces, Ann. Sci. École Norm. Sup., 28 (1995), 253-306. MR 96f:14061

30.
R. P. Stanley, Hilbert functions of graded algebras, Adv. in Math., 28 (1978), 57-83. MR 58:5637

31.
M. Van den Bergh, Differential operators on semi-invariants for tori and weighted projective spaces, \underline{in} ``Séminaire d'Algèbre P. Dubreil et M.-P. Malliavin'' (Lecture Notes in Math. No. 1478), Springer-Verlag, Berlin/New York, 1991. MR 93h:16046

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Additional Information:

T. Levasseur
Affiliation: Département de Mathématiques, Université de Brest, 29285 Brest, France
Email: Thierry.Levasseur@univ-brest.fr

J. T. Stafford
Affiliation: Department of Mathematics, University of Michigan, Ann Arbor, Michigan 48109
Email: jts@math.lsa.umich.edu

DOI: 10.1090/S1088-4165-99-00084-9
PII: S 1088-4165(99)00084-9
Keywords: Reductive Lie algebras, nilpotent orbits, differential operators, geometric quantization
Received by editor(s): September 7, 1999
Received by editor(s) in revised form: October 13, 1999
Posted: December 3, 1999
Additional Notes: The research of both authors was supported in part by NSF grant NSF-G-DMS 9801148
Copyright of article: Copyright 1999, American Mathematical Society

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