| Non-uniform stability for bounded semi-groups on Banach spaces CJK Batty, T Duyckaerts Journal of Evolution Equations 8 (4), 765-780, 2008 | 370 | 2008 |
| Scattering for the non-radial 3D cubic nonlinear Schrödinger equation T Duyckaerts, J Holmer, S Roudenko arXiv preprint arXiv:0710.3630, 2007 | 283 | 2007 |
| Classification of radial solutions of the focusing, energy-critical wave equation T Duyckaerts, C Kenig, F Merle arXiv preprint arXiv:1204.0031, 2012 | 215 | 2012 |
| On the optimality of the observability inequalities for parabolic and hyperbolic systems with potentials T Duyckaerts, X Zhang, E Zuazua Annales de l'Institut Henri Poincaré C, Analyse non linéaire 25 (1), 1-41, 2008 | 215 | 2008 |
| Universality of blow-up profile for small radial type II blow-up solutions of the energy-critical wave equation CE Kenig, T Duyckaerts, F Merle Journal of the European Mathematical Society 13 (3), 533-599, 2011 | 178 | 2011 |
| Dynamic of threshold solutions for energy-critical NLS T Duyckaerts, F Merle Geometric and Functional Analysis 18, 1787-1840, 2009 | 150 | 2009 |
| Universality of the blow-up profile for small type II blow-up solutions of the energy-critical wave equation: the nonradial case T Duyckaerts, CE Kenig, F Merle Journal of the European Mathematical Society 14 (5), 1389-1454, 2012 | 144 | 2012 |
| Dynamics of threshold solutions for energy-critical wave equation T Duyckaerts, F Merle International Mathematics Research Papers 2008, rpn002, 2008 | 137 | 2008 |
| Profiles of bounded radial solutions of the focusing, energy-critical wave equation T Duyckaerts, C Kenig, F Merle Geometric and Functional Analysis 22 (3), 639-698, 2012 | 119 | 2012 |
| Threshold solutions for the focusing 3D cubic Schrödinger equation T Duyckaerts, S Roudenko | 109 | 2010 |
| Soliton resolution along a sequence of times for the focusing energy critical wave equation T Duyckaerts, H Jia, C Kenig, F Merle Geometric and Functional Analysis 27 (4), 798-862, 2017 | 94 | 2017 |
| Scattering for radial, bounded solutions of focusing supercritical wave equations T Duyckaerts, C Kenig, F Merle International Mathematics Research Notices 2014 (1), 224-258, 2014 | 91 | 2014 |
| Optimal decay rates of the energy of a hyperbolic–parabolic system coupled by an interface T Duyckaerts Asymptotic Analysis 51 (1), 17-45, 2007 | 78 | 2007 |
| Going beyond the threshold: scattering and blow-up in the focusing NLS equation T Duyckaerts, S Roudenko Communications in Mathematical Physics 334, 1573-1615, 2015 | 64 | 2015 |
| Solutions of the focusing nonradial critical wave equation with the compactness property T Duyckaerts, CE Kenig, F Merle arXiv preprint arXiv:1402.0365, 2014 | 57 | 2014 |
| Minimal blow-up solutions to the mass-critical inhomogeneous NLS equation V Banica, R Carles, T Duyckaerts Communications in Partial Differential Equations 36 (3), 487-531, 2010 | 50 | 2010 |
| Resolvent conditions for the control of parabolic equations T Duyckaerts, L Miller Journal of Functional Analysis 263 (11), 3641-3673, 2012 | 40 | 2012 |
| Soliton resolution for critical co-rotational wave maps and radial cubic wave equation T Duyckaerts, C Kenig, Y Martel, F Merle Communications in Mathematical Physics 391 (2), 779-871, 2022 | 38 | 2022 |
| Weighted Strichartz estimates for radial Schr\" odinger equation on noncompact manifolds V Banica, T Duyckaerts arXiv preprint arXiv:0707.3370, 2007 | 38 | 2007 |
| Scattering profile for global solutions of the energy-critical wave equation T Duyckaerts, CE Kenig, F Merle Journal of the European Mathematical Society 21 (7), 2117-2162, 2019 | 37 | 2019 |
