Molecular scale contact line hydrodynamics of immiscible flows T Qian, XP Wang, P Sheng Physical Review E 68 (1), 016306, 2003 | 477 | 2003 |

A variational approach to moving contact line hydrodynamics T Qian, XP Wang, P Sheng Journal of Fluid Mechanics 564, 333-360, 2006 | 437 | 2006 |

A Gauss–Seidel projection method for micromagnetics simulations XP Wang, CJ Garcıa-Cervera, E Weinan Journal of Computational Physics 171 (1), 357-372, 2001 | 184 | 2001 |

Molecular hydrodynamics of the moving contact line in two-phase immiscible flows T Qian, XP Wang, P Sheng Communications in Computational Physics. , v. 1, (1), February 2006 , p. 1-52, 2006 | 144 | 2006 |

Moving contact line on chemically patterned surfaces XP Wang, T Qian, P Sheng Journal of fluid mechanics 605, 59-78, 2008 | 142 | 2008 |

Power-law slip profile of the moving contact line in two-phase immiscible flows T Qian, XP Wang, P Sheng Physical review letters 93 (9), 094501, 2004 | 138 | 2004 |

An iterative grid redistribution method for singular problems in multiple dimensions W Ren, XP Wang Journal of Computational Physics 159 (2), 246-273, 2000 | 129 | 2000 |

Stability of solitary waves for nonlinear Schrödinger equations with inhomogeneous nonlinearities G Fibich, XP Wang Physica D: Nonlinear Phenomena 175 (1-2), 96-108, 2003 | 103 | 2003 |

An efficient iterative thresholding method for image segmentation D Wang, H Li, X Wei, XP Wang Journal of Computational Physics 350, 657-667, 2017 | 101 | 2017 |

A gradient stable scheme for a phase field model for the moving contact line problem M Gao, XP Wang Journal of Computational Physics 231 (4), 1372-1386, 2012 | 100 | 2012 |

Numerical Methods for the Landau--Lifshitz Equation W E, XP Wang SIAM journal on numerical analysis 38 (5), 1647-1665, 2000 | 98* | 2000 |

Stability of isotropic singularities for the nonlinear Schrödinger equation MJ Landman, GC Papanicolaou, C Sulem, PL Sulem, XP Wang Physica D: Nonlinear Phenomena 47 (3), 393-415, 1991 | 97 | 1991 |

A finite element method for the numerical solution of the coupled Cahn–Hilliard and Navier–Stokes system for moving contact line problems K Bao, Y Shi, S Sun, XP Wang Journal of Computational Physics 231 (24), 8083-8099, 2012 | 90 | 2012 |

The focusing singularity of the Davey-Stewartson equations for gravity-capillary surface waves GC Papanicolaou, C Sulem, PL Sulem, XP Wang Physica D: Nonlinear Phenomena 72 (1-2), 61-86, 1994 | 85 | 1994 |

Wave collapse and instability of solitary waves of a generalized Kadomtsev-Petviashvili equation XP Wang, MJ Ablowitz, H Segur Physica D: Nonlinear Phenomena 78 (3-4), 241-265, 1994 | 79 | 1994 |

Nonlinear stability of solitary waves of a generalized Kadomtsev-Petviashvili equation Y Liu, XP Wang Communications in mathematical physics 183, 253-266, 1997 | 77 | 1997 |

Hydrodynamic slip boundary condition at chemically patterned surfaces: A continuum deduction from molecular dynamics T Qian, XP Wang, P Sheng Physical Review E—Statistical, Nonlinear, and Soft Matter Physics 72 (2 …, 2005 | 76 | 2005 |

A numerical method for a model of two-phase flow in a coupled free flow and porous media system J Chen, S Sun, XP Wang Journal of Computational Physics 268, 1-16, 2014 | 73 | 2014 |

Direct measurement of friction of a fluctuating contact line S Guo, M Gao, X Xiong, YJ Wang, X Wang, P Sheng, P Tong Physical review letters 111 (2), 026101, 2013 | 69 | 2013 |

New singular solutions of the nonlinear Schrödinger equation G Fibich, N Gavish, XP Wang Physica D: Nonlinear Phenomena 211 (3-4), 193-220, 2005 | 69 | 2005 |