Panagiotis E. Souganidis
Panagiotis E. Souganidis (Παναγιώτης E. Σουγανίδης) is a Greek-American mathematician, specializing in partial differential equations.[1]
Biography
Souganidis graduated in 1981 with B.A. from the National and Kapodistrian University of Athens. At the University of Wisconsin–Madison he graduated with M.A. in 1981[1] and Ph.D. in 1983 with thesis under the supervision of Michael G. Crandall.[2] Souganidis was a postdoc in 1984–1985 at the University of Minnesota's Institute for Mathematics and its Applications[1] and was at the Institute for Advanced Study in 1988 and 1990.[3] After holding professorships at Brown University, the University of Wisconsin–Madison, and the University of Texas at Austin, he became in 2008 the Charles H. Swift Distinguished Service Professor in Mathematics at the University of Chicago. He has held visiting positions at academic institutions in Italy, Japan, Greece, France, the UK, and Sweden.[1]
He works on non-linear partial differential equations, and stochastic analysis. The main parts of his work are qualitative properties of viscosity and entropy solutions, front propagation and asymptotic behavior of reaction diffusion equations and particle systems, stochastic homogenization, the theory of pathwise solutions for first and second order partial differential equations, including stochastic Hamilton-Jacobi equations and scalar conservation laws.[4]
Souganidis is the author or co-author of over 100 publications in refereed journals. His wife is Thaleia Zariphopoulou,[5] a Greek-American mathematician and professor at the University of Texas at Austin.
Awards and honors
- 1989 — Sloan Research Fellow[1]
- 1994 — Invited Speaker of the International Congress of Mathematicians[6]
- 2003 — Highly Cited Researcher
- 2012 — Fellow of the American Mathematical Society (Class of 2013)
- 2015 — Fellow of the Society for Industrial and Applied Mathematics[7]
- 2017 — Fellow of the American Association for the Advancement of Science
- 2019 — Invited Speaker of the International Congress on Industrial and Applied Mathematics[8]
Selected publications
- Evans, L. C.; Souganidis, P. E. (1984). "Differential Games and Representation Formulas for Solutions of Hamilton-Jacobi-Isaacs Equations". Indiana University Mathematics Journal. 33 (5): 773–797. doi:10.1512/iumj.1984.33.33040. JSTOR 45010271.
- Souganidis, Panagiotis E. (1985). "Approximation schemes for viscosity solutions of Hamilton-Jacobi equations". Journal of Differential Equations. 59 (1): 1–43. Bibcode:1985JDE....59....1S. doi:10.1016/0022-0396(85)90136-6.
- Lions, P.-L.; Souganidis, P. E. (1985). "Differential Games, Optimal Control and Directional Derivatives of Viscosity Solutions of Bellman's and Isaacs' Equations". SIAM Journal on Control and Optimization. 23 (4): 566–583. doi:10.1137/0323036.
- Bona, J. L.; Souganidis, P. E.; Strauss, W. A. (1987). "Stability and Instability of Solitary Waves of Korteweg-de Vries Type". Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences. 411 (1841): 395–412. Bibcode:1987RSPSA.411..395B. doi:10.1098/rspa.1987.0073.
- Fleming, W. H.; Souganidis, P. E. (1989). "On the Existence of Value Functions of Two-Player, Zero-Sum Stochastic Differential Games". Indiana University Mathematics Journal. 38 (2): 293–314. doi:10.1512/iumj.1989.38.38015. JSTOR 24895386.
- Bona, J. L.; Souganidis, P. E.; Strauss, W. A. (1987). "Stability and Instability of Solitary Waves of Korteweg-de Vries Type". Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences. 411 (1841): 395–412. Bibcode:1987RSPSA.411..395B. doi:10.1098/rspa.1987.0073.
- Barles, G.; Soner, H. M.; Souganidis, P. E. (1993). "Front Propagation and Phase Field Theory". SIAM Journal on Control and Optimization. 31 (2): 439–469. doi:10.1137/0331021.
- Lions, Pierre-Louis; Perthame, Benoît; Souganidis, Panagiotis E. (1998). "Existence and stability of entropy solutions for the hyperbolic systems of isentropic gas dynamics in Eulerian and Lagrangian coordinates". Communications on Pure and Applied Mathematics. 49 (6): 599–638. doi:10.1002/(SICI)1097-0312(199606)49:6<599::AID-CPA2>3.0.CO;2-5.
- Barles, Guy; Souganidis, Panagiotis E. (1998). "A New Approach to Front Propagation Problems: Theory and Applications". Archive for Rational Mechanics and Analysis. 141 (3): 237–296. Bibcode:1998ArRMA.141..237B. doi:10.1007/s002050050077.
- Lions, Pierre-Louis; Souganidis, Panagiotis E. (2003). "Correctors for the homogenization of Hamilton-Jacobi equations in the stationary ergodic setting". Communications on Pure and Applied Mathematics. 56 (10): 1501–1524. doi:10.1002/cpa.10101.
References
- "Curriculum Vitae, Panagiotis E. Souganidis" (PDF). Department of Mathematics, University of Chicago.
- Panagiotis E. Souganidis at the Mathematics Genealogy Project
- "Panagiotis E. Souganidis". Institute for Advanced Study.
- "Prof. Panagiotis E. Souganidis". International Congress on Industrial and Applied Mathematics, July 15–19 Valencia, Spain (ICIAM 2019).
- "Van Vleck Notes: The Newsletter of the Mathematics Department of the University of Wisconsin, Number 5" (PDF). Fall 1992.
- Souganidis, P.E. (1995). "Interface dynamics in phase transitions". In Chatterji, S.D. (ed.). Proceedings of the International Congress of Mathematicians, 1994, Zürich. pp. 1133–1144. doi:10.1007/978-3-0348-9078-6_106. ISBN 978-3-0348-9897-3.
- "Former IMA Postdoc Elected as Fellow of SIAM". Institute for Mathematics and its Applications, University of Minnesota.
- "Invited Speakers". International Congress on Industrial and Applied Mathematics, July 15–19 Valencia, Spain (ICIAM 2019). Nonlinear PDE with rough (stochastic) time dependence: applications and theory by P. E. Souganidis, joint program with P.-L. Lions
External links
- International Centre for Theoretical Physics (ICTP) talks by Panagiotis Souganidis, 2018
- "Phase-field models for motion by mean curvature - 1". YouTube. ICTP Mathematics. 11 June 2018.
- "Phase-field models for motion by mean curvature - 2". YouTube. ICTP Mathematics. 12 June 2018.
- "Phase-field models for motion by mean curvature - 3". YouTube. ICTP Mathematics. 12 June 2018.
- "Phase-field models for motion by mean curvature - 4". YouTube. ICTP Mathematics. 14 June 2018.