International Mathematics Research Papers

International Mathematics Research Papers (2006) Vol. 2006 : article ID 68213, 74 pages, doi:10.1155/IMRP/2006/68213

This Article Abstract Full Text (PDF) Alert me when this article is cited Alert me if a correction is posted Services Email this article to a friend Similar articles in this journal Alert me to new issues of the journal Add to My Personal Archive Download to citation manager Request Permissions How to cite this article Google Scholar Articles by Gan, W. T. Articles by Hundley, J. Search for Related Content Social Bookmarking          What's this?

Copyright © 2006 Hindawi Publishing Corporation. All rights reserved.

The spin L-function of quasi-split D₄

Wee Teck Gan and Joseph Hundley

Department of Mathematics, University of California San Diego, 9500 Gilman Drive, La Jolla, CA 92093, USA E-mail address: wgan{at}math.ucsd.edu
Department of Mathematics, Penn State University University Park, State College, PA 16802, USA E-mail address: hundley{at}math.psu.edu

We construct a multivariable Rankin-Selberg integral for the Spin L-function of a globally generic cuspidal representation of an arbitrary quasi-split group of type D₄. This proves the meromorphic continuation of this L-function. When the quasi-split group of type D₄ is associated to a cubic field extention, this L-function cannot be analyzed by the Langlands-Shahidi method.

References

1. Black G. R. E., King R. C., Wybourne B. G. Kronecker products for compact semisimple Lie groups. Journal of Physics. A. Mathematical and General (1983) 16(8):1555–1589.[CrossRef][Web of Science]
2. Borel A. Automorphic L-functions. In: Proc. Sympos. Pure Math. XXXIII (1979) Automorphic Forms, Representations and L-Functions, 1977: Proc. Sympos. Pure Math. Oregon State Univ. Corvallis, Ore. Rhode Island: American Mathematical Society. 27–61. Part 2.
3. Brion M. Invariants d'un sous-groupe unipotent maximal d'un groupe semi-simple. Annales de l'Institut Fourier (Grenoble) (1983) 33(1):1–27.
4. Bump D. Lie Groups. In: Graduate Texts in Mathematics (2004) 225. New York: Springer. xii+451.
5. Fulton W., Harris J. Representation Theory: A First Course. In: Graduate Texts in Mathematics (1991) 129. New York: Springer. xvi+551.
6. Gan W. T., Gurevich N., Jiang D. Cubic unipotent Arthur parameters and multiplicities of square integrable automorphic forms. Inventiones Mathematicae (2002) 149(2):225–265.[CrossRef][Web of Science]
7. Gan W. T., Savin G. On minimal representations definitions and properties. Representation Theory (2005) 9:46–93.[CrossRef]
8. Ginzburg D. On the standard L-function for G₂. Duke Mathematical Journal (1993) 69(2):315–333.[CrossRef][Web of Science]
9. Ginzburg D., Hundley J. Multivariable Rankin-Selberg integrals for orthogonal groups. International Mathematics Research Notices (2004) 2004(58):3097–3119.[Abstract/Free Full Text]
10. Ginzburg D., Hundley J. A new tower of Rankin-Selberg integrals. Electronic Research Announcements. Journal of the American Mathematical Society (2006) 12:56–62.[CrossRef]
11. Gross B. H. Groups over . Inventiones Mathematicae (1996) 124(1–3):263–279.[CrossRef][Web of Science]
12. Jacquet H. Fonctions de Whittaker associées aux groupes de Chevalley. Bulletin de la Société Mathématique de France (1967) 95:243–309.[Web of Science]
13. Jacquet H. Integral representation of Whittaker functions. In: Contributions to Automorphic Forms, Geometry, and Number Theory (2004) Maryland: Johns Hopkins University Press. 373–419.
14. Jacquet H., Shalika J. Exterior square L-functions. In: Perspect. Math. (1990) 11. Automorphic Forms, Shimura Varieties, and L-Functions, Vol. II, 1988: Ann Arbor, MI. Massachusetts: Academic Press. 143–226.
15. Kazhdan D. The minimal representation of D₄. In: Progr. Math. (1990) 92. Operator Algebras, Unitary Representations, Enveloping Algebras, and Invariant Theory, 1989: Paris. Massachusetts: Birkhäuser. 125–158.
16. Kazhdan D., Polishchuk A. Minimal representations: spherical vectors and automorphic functionals. In: Algebraic Groups and Arithmetic (2004) Mumbai: Tata Inst. Fund. Res. 127–198.
17. King R. C. Kronecker products of representations of exceptional Lie groups. Journal of Physics. A. Mathematical and General (1981) 14(1):77–83.[CrossRef][Web of Science]
18. Koike K. Representations of spinor groups and the difference characters of SO(2n). Advances in Mathematics (1997) 128(1):40–81.[CrossRef][Web of Science]
19. Koike K., Terada I. Young-diagrammatic methods for the representation theory of the classical groups of type B_n, C_n, D_n. Journal of Algebra (1987) 107(2):466–511.[CrossRef][Web of Science]
20. MacDonald I. G. Symmetric Functions and Hall Polynomials (1979) New York: The Clarendon Press, Oxford University Press. viii+180.
21. Soudry D. On the Archimedean theory of Rankin-Selberg convolutions for SO_{2l + 1} x GL_n. Annales Scientifiques de l'École Normale Supérieure. Quatrième Série (1995) 28(2):161–224.
22. Tamir B. On L-functions and intertwining operators for unitary groups. Israel Journal of Mathematics (1991) 73(2):161–188.[Web of Science]

CiteULike    Connotea    Del.icio.us    What's this?

This Article Abstract Full Text (PDF) Alert me when this article is cited Alert me if a correction is posted Services Email this article to a friend Similar articles in this journal Alert me to new issues of the journal Add to My Personal Archive Download to citation manager Request Permissions How to cite this article Google Scholar Articles by Gan, W. T. Articles by Hundley, J. Search for Related Content Social Bookmarking          What's this?