Daniel Tataru
Affiliations: | Mathematics | University of California, Berkeley, Berkeley, CA, United States |
Area:
Partial differential equationsGoogle:
"Daniel Tataru"Children
Sign in to add traineeIoan 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 |
BETA: Related publications
See more...
Publications
You can help our author matching system! If you notice any publications incorrectly attributed to this author, please sign in and mark matches as correct or incorrect. |
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 |