András Vasy
András Vasy (born 1969 in Hungary) is an American, Hungarian mathematician working in the areas of partial differential equations, microlocal analysis, scattering theory, and inverse problems. He is currently a professor of mathematics at Stanford University.[1]
András Vasy | |
---|---|
Born | 1969 (age 51–52) |
Nationality | American, Hungarian |
Alma mater | Massachusetts Institute of Technology |
Awards | Alfred P. Sloan Research Fellowship (2002-2004) Clay Research Fellowship (2004-2006) Bôcher Prize (2017) |
Scientific career | |
Fields | Mathematics |
Institutions | Massachusetts Institute of Technology Stanford University |
Thesis | Propagation of singularities in three-body scattering (1997) |
Doctoral advisor | Richard B. Melrose |
Education and career
Vasy attended Stanford University, obtaining his B.S. in Physics and M.S. in Mathematics in 1993. He received his Ph.D. from MIT under the supervision of Richard B. Melrose in 1997.[2] Following his postdoctoral appointment at the University of California, Berkeley, he joined the MIT faculty as an assistant professor in 1999. He was awarded tenure at MIT in 2005[3] during a long-term stay at Northwestern University before moving to Stanford in 2006.
Awards and honors
Vasy was an Alfred P. Sloan Research Fellow from 2002 to 2004,[4] and a Clay Research Fellow from 2004 to 2006.[5] He was elected a Fellow of the American Mathematical Society in 2012. He was an invited speaker at the International Congress of Mathematicians in Seoul in 2014.[6] In 2017, he was awarded the Bôcher Prize of the American Mathematical Society.[7]
Research
The unifying feature of Vasy's work is the application of tools from microlocal analysis to problems in hyperbolic partial differential or pseudo-differential equations. He analyzed the propagation of singularities for solutions of wave equations on manifolds with corners[8] or more complicated boundary structures, partially in joint work with Richard Melrose and Jared Wunsch.[9] For his paper on a unified approach to scattering theory on asymptotically hyperbolic spaces and spacetimes arising in Einstein's theory of general relativity such as de Sitter space and Kerr-de Sitter spacetimes,[10] he was awarded the Bôcher Prize in 2017. This paper led to further advances, including the proof, by Vasy and Peter Hintz, of the global nonlinear stability of the Kerr-de Sitter family of black hole spacetimes,[11] and a new proof of Smale's conjecture for Anosov flows by Semyon Dyatlov and Maciej Zworski.[12] Vasy has also collaborated with Gunther Uhlmann on inverse problems for geodesic transforms.[13]
References
- Website at Stanford University
- András Vasy in the Mathematics Genealogy Project
- "25 faculty members earn tenure"
- List of past Sloan Fellows
- András Vasy, Clay Mathematics Institute
- Scientific program
- "Andras Vasy to Receive 2017 AMS Bôcher Prize"
- András Vasy, "Propagation of singularities for the wave equation on manifolds with corners", Annals of Mathematics 168, 749-812 (2008)
- Jared Wunsch, András Vasy, and Richard B. Melrose, "Propagation of singularities for the wave equation on edge manifolds", Duke Math. J. 144(1), pp. 109-193 (2008)
- András Vasy, "Microlocal analysis of asymptotically hyperbolic and Kerr-de Sitter spaces (with an appendix by Semyon Dyatlov)", Inventiones Mathematicae 194(2), pp. 381–513 (2013)
- Peter Hintz and András Vasy, "The global non-linear stability of the Kerr–de Sitter family of black holes", Acta Mathematica 220(1), pp. 1-206 (2018)
- Semyon Dyatlov and Maciej Zworski, "Dynamical zeta functions for Anosov flows via microlocal analysis", Annales scientifiques de l'ENS 49(3), pp. 543-577 (2016)
- Gunther Uhlmann and András Vasy, "The inverse problem for the local geodesic ray transform", Inventiones Mathematicae 205(1), pp. 83-120 (2016)