Daniel Bump
Daniel Willis Bump (born 1952) is a mathematician who is a professor at Stanford University. He is a fellow of the American Mathematical Society since 2015, for "contributions to number theory, representation theory, combinatorics, and random matrix theory, as well as mathematical exposition".[1]
He has a Bachelor of Arts from Reed College, where he graduated in 1974.[2] He obtained his Ph.D. from the University of Chicago in 1982 under the supervision of Walter Lewis Baily, Jr.[3] Among his students is president of the National Association of Mathematicians Edray Goins.
Selected publications
- Bump, D., & Schilling A. (2017). "Crystal Bases: Representations and Combinatorics". World Scientific
- Bump, D. (1998). Automorphic forms and representations. Cambridge University Press.
- Bump, D. (2004). Lie Groups. Springer. ISBN 978-0387211541.
- Bump, D. (1998). Algebraic Geometry. World Scientific.
- Bump, D., Friedberg, S., & Hoffstein, J. (1990). "Nonvanishing theorems for L-functions of modular forms and their derivatives". Inventiones Mathematicae, 102(1), pp. 543–618.
- Bump, D., & Ginzburg, D. (1992). "Symmetric square L-functions on GL(r)". Annals of Mathematics, 136(1), pp. 137–205.
References
- ^ "List of Fellows of the American Mathematical Society". ams.org. Retrieved 2016-05-11.
- ^ "Daniel Bump's Profile". Stanford Profiles. Retrieved 25 April 2019.
- ^ Daniel Willis Bump at the Mathematics Genealogy Project
External links
| International | |
|---|---|
| National | |
| Academics | |
| Other | |
 | This article about a mathematician is a stub. You can help Wikipedia by expanding it. |