Daniel Tataru
Affiliations: | Mathematics | University of California, Berkeley, Berkeley, CA, United States |
Area:
Partial differential equationsGoogle:
"Daniel Tataru"Children
Sign in to add trainee| Ioan Bejenaru | grad student | 2004 | UC Berkeley |
| Jeremy L. Marzuola | grad student | 2007 | UC Berkeley |
| Mihai H. Tohaneanu | grad student | 2009 | UC Berkeley |
| Baoping Liu | grad student | 2012 | UC Berkeley |
| Boris Ettinger | grad student | 2013 | UC Berkeley |
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Publications
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| Huang J, Tataru D. (2024) Local Well-Posedness of the Skew Mean Curvature Flow for Small Data in Dimensions. Archive For Rational Mechanics and Analysis. 248: 10 |
| Disconzi MM, Ifrim M, Tataru D. (2022) The relativistic Euler equations with a physical vacuum boundary: Hadamard local well-posedness, rough solutions, and continuation criterion. Archive For Rational Mechanics and Analysis. 245: 127-182 |
| Huang J, Tataru D. (2022) Local Well-Posedness of Skew Mean Curvature Flow for Small Data in Dimensions. Communications in Mathematical Physics. 389: 1569-1645 |
| Metcalfe J, Sterbenz J, Tataru D. (2020) Local energy decay for scalar fields on time dependent non-trapping backgrounds American Journal of Mathematics. 142: 821-883 |
| Ifrim M, Tataru D. (2019) Well-posedness and dispersive decay of small data solutions for the Benjamin-Ono equation Annales Scientifiques De L Ecole Normale Superieure. 52: 297-335 |
| Ifrim M, Tataru D. (2019) Two-dimensional gravity water waves with constant vorticity, I: Cubic lifespan Analysis & Pde. 12: 903-967 |
| Fu Y, Tataru D. (2019) Null Structures and Degenerate Dispersion Relations in Two Space Dimensions International Mathematics Research Notices |
| Ifrim M, Tataru D. (2019) The NLS approximation for two dimensional deep gravity waves Science China-Mathematics. 62: 1101-1120 |
| Oh S, Tataru D. (2019) The Hyperbolic Yang–Mills Equation for Connections in an Arbitrary Topological Class Communications in Mathematical Physics. 365: 685-739 |
| Oh S, Tataru D. (2018) Energy dispersed solutions for the (4 + 1)-dimensional Maxwell-Klein-Gordon equation American Journal of Mathematics. 140: 1-82 |