David Vogan
David Vogan | |
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Born |
8 September 1954 Mercer, Pennsylvania |
Fields | Mathematics |
Institutions | M.I.T. |
Alma mater | M.I.T. |
Doctoral advisor | Bertram Kostant |
Doctoral students |
Pramod Achar Jing-Song Huang Peter Trapa Monica Nevins |
Notable awards | Levi L. Conant Prize (2011) |
David Alexander Vogan, Jr. is a mathematician at M.I.T. who works on unitary representations of simple Lie groups. He received his Ph.D. from M.I.T. in 1976, under the supervision of Bertram Kostant.[1] He is one of the participants in the Atlas of Lie Groups and Representations.
In 2012 he became a fellow of the American Mathematical Society.[2] He was president of the AMS in 2013–2014.[3]
Publications
- Representations of real reductive Lie groups. Birkhäuser, 1981[4]
- Unitary representations of reductive Lie groups. Princeton University Press, 1987 ISBN 0-691-08482-3[5]
- with Paul Sally (ed.): Representation theory and harmonic analysis on semisimple Lie groups. American Mathematical Society, 1989
- with Jeffrey Adams & Dan Barbasch (ed.): The Langlands Classification and Irreducible Characters for Real Reductive Groups. Birkhäuser, 1992
- with Anthony W. Knapp: Cohomological Induction and Unitary Representations. Princeton University Press, 1995 ISBN 0-691-03756-6
- with Joseph Wolf & Juan Tirao (ed.): Geometry and representation theory of real and p-adic groups. Birkhäuser, 1998
- with Jeffrey Adams (ed.): Representation theory of Lie groups. American Mathematical Society, 2000
- The Character Table for E8. In: Notices of the AMS. Nr. 9, 2007 (PDF)
See also
References
- ↑ David Vogan at the Mathematics Genealogy Project
- ↑ List of Fellows of the American Mathematical Society, retrieved 2013-08-29.
- ↑ David A. Vogan, Jr. (1954 - ), AMS Presidents: A Timeline
- ↑ Springer, A. T. (1983). Review: Representations of real reductive Lie groups, by David A. Vogan, jr (PDF). Bull. Amer. Math. Soc. (N.S.) 8. pp. 365–371. doi:10.1090/s0273-0979-1983-15126-1.
- ↑ Knapp, A. W. (1989). "Unitary representations of reductive Lie groups, by David A. Vogan, jr" (PDF). Bull. Amer. Math. Soc. (N.S.) 21 (2): 380–384. doi:10.1090/s0273-0979-1989-15872-2.
External links
- Home page for David Vogan
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