Arick Shao, Ph.D.
Affiliations: | 2010 | Princeton University, Princeton, NJ |
Area:
Mathematics, Theory PhysicsGoogle:
"Arick Shao"Parents
Sign in to add mentorSergiu Klainerman | grad student | 2010 | Princeton | |
(Breakdown criteria for nonvacuum Einstein equations.) |
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Publications
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Shao A. (2019) On Carleman and observability estimates for wave equations on time‐dependent domains Proceedings of the London Mathematical Society. 119: 998-1064 |
Alexakis S, Shao A. (2017) On the profile of energy concentration at blow-up points for subconformal focusing nonlinear waves Transactions of the American Mathematical Society. 369: 5525-5542 |
Holzegel G, Shao A. (2017) Unique continuation from infinity in asymptotically anti-de Sitter spacetimes II: Non-static boundaries Communications in Partial Differential Equations. 42: 1871-1922 |
Alexakis S, Shao A. (2016) Bounds on the Bondi energy by a flux of curvature Journal of the European Mathematical Society. 18: 2045-2106 |
Alexakis S, Schlue V, Shao A. (2016) Unique continuation from infinity for linear waves Advances in Mathematics. 286: 481-544 |
Holzegel G, Shao A. (2016) Unique Continuation from Infinity in Asymptotically Anti-de Sitter Spacetimes Communications in Mathematical Physics. 1-53 |
Alexakis S, Shao A. (2015) Global uniqueness theorems for linear and nonlinear waves Journal of Functional Analysis. 269: 3458-3499 |
Shao A. (2014) New tensorial estimates in Besov spaces for time-dependent (2 + 1)-dimensional problems Journal of Hyperbolic Differential Equations. 11: 821-908 |
Alexakis S, Shao A. (2014) On the geometry of null cones to infinity under curvature flux bounds Classical and Quantum Gravity. 31 |
Shao A. (2011) A Generalized Representation Formula for Systems of Tensor Wave Equations Communications in Mathematical Physics. 306: 51-82 |