Relaxation of solitons in nonlinear Schrödinger equations with potential Z Gang, IM Sigal Advances in Mathematics 216 (2), 443-490, 2007 | 84 | 2007 |

Asymptotic stability of nonlinear Schrödinger equations with potential Z Gang, IM Sigal Reviews in Mathematical Physics 17 (10), 1143-1207, 2005 | 53 | 2005 |

Dynamics of nonlinear Schrödinger/Gross–Pitaevskii equations: mass transfer in systems with solitons and degenerate neutral modes G Zhou, M Weinstein Analysis & PDE 1 (3), 267-322, 2008 | 40 | 2008 |

Neck pinching dynamics under mean curvature flow Z Gang, IM Sigal Journal of Geometric Analysis 19 (1), 36-80, 2009 | 38 | 2009 |

Derivation of an effective evolution equation for a strongly coupled polaron RL Frank, G Zhou Analysis & PDE 10 (2), 379-422, 2017 | 35 | 2017 |

On soliton dynamics in nonlinear Schrödinger equations Z Gang, IM Sigal Geometric & Functional Analysis GAFA 16 (6), 1377-1390, 2006 | 32 | 2006 |

Universality in mean curvature flow neckpinches Z Gang, D Knopf Duke Mathematical Journal 164 (12), 2341-2406, 2015 | 31 | 2015 |

Friction in a model of Hamiltonian dynamics J Fröhlich, Z Gang, A Soffer Communications in Mathematical Physics 315, 401-444, 2012 | 25 | 2012 |

Some Hamiltonian models of friction J Fröhlich, Z Gang, A Soffer Journal of mathematical physics 52 (8), 2011 | 23 | 2011 |

Neckpinch dynamics for asymmetric surfaces evolving by mean curvature flow Z Gang, D Knopf, I Sigal American Mathematical Society 253 (1210), 2018 | 22 | 2018 |

Emission of Cherenkov radiation as a mechanism for Hamiltonian friction J Fröhlich, Z Gang Advances in Mathematics 264, 183-235, 2014 | 22 | 2014 |

Blow-up in nonlinear heat equations S Dejak, Z Gang, IM Sigal, S Wang Advances in Applied Mathematics 40 (4), 433-481, 2008 | 21 | 2008 |

Equipartition of Mass in Nonlinear Schrödinger/Gross–Pitaevskii Equations Z Gang, MI Weinstein Applied Mathematics Research Express 2011 (2), 123-181, 2011 | 15 | 2011 |

Ballistic motion of a tracer particle coupled to a Bose gas J Fröhlich, Z Gang Advances in Mathematics 259, 252-268, 2014 | 13 | 2014 |

Adiabatic theorem for the Gross–Pitaevskii equation Z Gang, P Grech Communications in Partial Differential Equations 42 (5), 731-756, 2017 | 12 | 2017 |

On the mean convexity of a space-and-time neighborhood of generic singularities formed by mean curvature flow Z Gang The Journal of Geometric Analysis 31, 9819-9890, 2021 | 11 | 2021 |

A non-linear adiabatic theorem for the one-dimensional Landau–Pekar equations RL Frank, Z Gang Journal of Functional Analysis 279 (7), 108631, 2020 | 11 | 2020 |

Exponential convergence to the Maxwell distribution for some class of Boltzmann equations J Fröhlich, Z Gang Communications in Mathematical Physics 314 (2), 525-554, 2012 | 10 | 2012 |

Neckpinch dynamics for asymmetric surfaces evolving by mean curvature flow Z Gang, D Knopf, IM Sigal arXiv preprint arXiv:1109.0939, 2011 | 10 | 2011 |

Hamiltonian dynamics of a particle interacting with a wave field D Egli, J Fröhlich, Z Gang, A Shao, IM Sigal Communications in Partial Differential Equations 38 (12), 2155-2198, 2013 | 9 | 2013 |