Andrew Lawrie
Affiliations: | 2013-2016 | Mathematics | University of California, Berkeley, Berkeley, CA, United States |
| 2016- | Massachusetts Institute of Technology, Cambridge, MA, United States |
Area:
Partial differential equations, Harmonic Analysis.Website:
http://math.mit.edu/~alawrie/Google:
"Andrew Lawrie"Parents
Sign in to add mentor| Wilhelm Schlag | grad student | 2013 | Chicago | |
| (On the global behavior of wave maps.) | ||||
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Publications
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| Lawrie A, Oh S, Shahshahani S. (2018) The Cauchy Problem for Wave Maps on Hyperbolic Space in Dimensions $d\geq 4$ International Mathematics Research Notices. 2018: 1954-2051 |
| Jendrej J, Lawrie A. (2018) Two-bubble dynamics for threshold solutions to the wave maps equation Inventiones Mathematicae. 213: 1249-1325 |
| Côte R, Kenig CE, Lawrie A, et al. (2018) Profiles for the Radial Focusing 4 d Energy-Critical Wave Equation Communications in Mathematical Physics. 357: 943-1008 |
| Lawrie A, Oh S, Shahshahani S. (2017) Equivariant wave maps on the hyperbolic plane with large energy Mathematical Research Letters. 24: 449-479 |
| Lawrie A, Oh S, Shahshahani S. (2017) Stability of stationary equivariant wave maps from the hyperbolic plane American Journal of Mathematics. 139: 1085-1147 |
| Lawrie A, Oh S, Shahshahani S. (2016) Gap eigenvalues and asymptotic dynamics of geometric wave equations on hyperbolic space Journal of Functional Analysis. 271: 3111-3161 |
| Lawrie A, Oh SJ. (2016) A Refined Threshold Theorem for (1 + 2)-Dimensional Wave Maps into Surfaces Communications in Mathematical Physics. 342: 989-999 |
| Dodson B, Lawrie A. (2015) Scattering for the radial 3D cubic wave equation Analysis and Pde. 8: 467-497 |
| Côte R, Kenig CE, Lawrie A, et al. (2015) Characterization of large energy solutions of the equivariant wave map problem: II American Journal of Mathematics. 137: 209-250 |
| Kenig C, Lawrie A, Liu B, et al. (2015) Channels of energy for the linear radial wave equation Advances in Mathematics. 285: 877-936 |