Nonlinear Schrödinger equations at critical regularity R Killip, M Visan Evolution equations 17, 325-437, 2013 | 287 | 2013 |

Sum rules for Jacobi matrices and their applications to spectral theory R Killip, B Simon Annals of mathematics, 253-321, 2003 | 254 | 2003 |

The cubic nonlinear Schrödinger equation in two dimensions with radial data R Killip, T Tao, M Vișan Journal of the European Mathematical Society 11 (6), 1203-1258, 2009 | 253 | 2009 |

Matrix models for circular ensembles R Killip, I Nenciu International Mathematics Research Notices 2004 (50), 2665-2701, 2004 | 243 | 2004 |

The focusing energy-critical nonlinear Schrödinger equation in dimensions five and higher R Killip, M Visan American Journal of Mathematics 132 (2), 361-424, 2010 | 240 | 2010 |

On the Absolutely Continuous Spectrum¶ of One-Dimensional Schrödinger Operators¶ with Square Summable Potentials P Deift, R Killip Communications in mathematical physics 203, 341-347, 1999 | 219 | 1999 |

The mass-critical nonlinear Schrödinger equation with radial data in dimensions three and higher R Killip, M Visan, X Zhang Analysis & PDE 1 (2), 229-266, 2009 | 147 | 2009 |

KdV is well-posed in R Killip, M Viºan Annals of Mathematics 190 (1), 249-305, 2019 | 138 | 2019 |

Uniform spectral properties of one-dimensional quasicrystals, III. α-continuity D Damanik, R Killip, D Lenz Communications in Mathematical Physics 212, 191-204, 2000 | 128 | 2000 |

Perturbations of orthogonal polynomials with periodic recursion coefficients D Damanik, R Killip, B Simon Annals of mathematics, 1931-2010, 2010 | 103 | 2010 |

Eigenvalue statistics for CMV matrices: from Poisson to clock via random matrix ensembles R Killip, M Stoiciu | 103 | 2009 |

Energy-Supercritical NLS: Critical *[Hdot]* ^{ s }-Bounds Imply ScatteringR Killip, M Visan Communications in Partial Differential Equations 35 (6), 945-987, 2010 | 98 | 2010 |

Adaptive single-shot phase measurements: A semiclassical approach HM Wiseman, RB Killip Physical Review A 56 (1), 944, 1997 | 96 | 1997 |

Sobolev spaces adapted to the Schrödinger operator with inverse-square potential R Killip, C Miao, M Visan, J Zhang, J Zheng Mathematische Zeitschrift 288, 1273-1298, 2018 | 91 | 2018 |

Solitons and Scattering for the Cubic–Quintic Nonlinear Schrödinger Equation on R Killip, T Oh, O Pocovnicu, M Viºan Archive for Rational Mechanics and Analysis 225, 469-548, 2017 | 91 | 2017 |

Adaptive single-shot phase measurements: The full quantum theory HM Wiseman, RB Killip Physical Review A 57 (3), 2169, 1998 | 91 | 1998 |

The focusing cubic NLS with inverse-square potential in three space dimensions R Killip, J Murphy, M Visan, J Zheng | 89 | 2017 |

The defocusing energy-supercritical nonlinear wave equation in three space dimensions R Killip, M Visan Transactions of the American Mathematical Society 363 (7), 3893-3934, 2011 | 86 | 2011 |

The energy-critical NLS with inverse-square potential R Killip, C Miao, M Visan, J Zhang, J Zheng arXiv preprint arXiv:1509.05822, 2015 | 85 | 2015 |

Low regularity conservation laws for integrable PDE R Killip, M Viºan, X Zhang Geometric and functional analysis 28, 1062-1090, 2018 | 82 | 2018 |