A second order in time, uniquely solvable, unconditionally stable numerical scheme for Cahn–Hilliard–Navier–Stokes equation D Han, X Wang Journal of Computational Physics 290, 139-156, 2015 | 112 | 2015 |

Linearly first-and second-order, unconditionally energy stable schemes for the phase field crystal model X Yang, D Han Journal of Computational Physics 330, 1116-1134, 2017 | 95 | 2017 |

Numerical analysis of second order, fully discrete energy stable schemes for phase field models of two-phase incompressible flows D Han, A Brylev, X Yang, Z Tan Journal of Scientific Computing 70 (3), 965-989, 2017 | 70 | 2017 |

Two‐phase flows in karstic geometry D Han, D Sun, X Wang Mathematical Methods in the Applied Sciences 37 (18), 3048-3063, 2014 | 33 | 2014 |

Existence and uniqueness of global weak solutions to a Cahn–Hilliard–Stokes–Darcy system for two phase incompressible flows in karstic geometry D Han, X Wang, H Wu Journal of Differential Equations 257 (10), 3887-3933, 2014 | 32 | 2014 |

Boundary layer for a class of nonlinear pipe flow D Han, AL Mazzucato, D Niu, X Wang Journal of Differential Equations 252 (12), 6387-6413, 2012 | 25 | 2012 |

A Decoupled Unconditionally Stable Numerical Scheme for the Cahn–Hilliard–Hele-Shaw System D Han Journal of Scientific Computing 66 (3), 1102-1121, 2016 | 20 | 2016 |

Decoupled energy‐law preserving numerical schemes for the C ahn–H illiard–D arcy system D Han, X Wang Numerical Methods for Partial Differential Equations 32 (3), 936-954, 2016 | 18 | 2016 |

Uniquely solvable and energy stable decoupled numerical schemes for the Cahn–Hilliard–Stokes–Darcy system for two-phase flows in karstic geometry W Chen, D Han, X Wang Numerische Mathematik 137 (1), 229-255, 2017 | 14 | 2017 |

Initial–boundary layer associated with the nonlinear Darcy–Brinkman system D Han, X Wang Journal of Differential Equations 256 (2), 609-639, 2014 | 12 | 2014 |

A second order in time, decoupled, unconditionally stable numerical scheme for the Cahn–Hilliard–Darcy system D Han, X Wang Journal of Scientific Computing 77 (2), 1210-1233, 2018 | 11 | 2018 |

On the instabilities and transitions of the western boundary current D Han, M Hernandez, Q Wang Global-Science Press 26 (1), 35, 2019 | 9 | 2019 |

Dynamic bifurcation and transition in the Rayleigh–Bénard convection with internal heating and varying gravity D Han, M Hernandez, Q Wang Communications in Mathematical Sciences 17 (1), 175-192, 2019 | 7 | 2019 |

Dynamical transitions of a low-dimensional model for Rayleigh–Bénard convection under a vertical magnetic field D Han, M Hernandez, Q Wang Chaos, Solitons & Fractals 114, 370-380, 2018 | 7 | 2018 |

Initial–boundary layer associated with the nonlinear Darcy–Brinkman–Oberbeck–Boussinesq system M Fei, D Han, X Wang Physica D: Nonlinear Phenomena 338, 42-56, 2017 | 4 | 2017 |

Deformation and coalescence of ferrodroplets in Rosensweig model using the phase field and modified level set approaches under uniform magnetic fields F Bai, D Han, X He, X Yang Communications in Nonlinear Science and Numerical Simulation 85, 105213, 2020 | 3 | 2020 |

Dynamic transitions and bifurcations for thermal convection in the superposed free flow and porous media D Han, Q Wang, X Wang Physica D: Nonlinear Phenomena 414, 132687, 2020 | 2 | 2020 |

A second order, linear, unconditionally stable, Crank–Nicolson–Leapfrog scheme for phase field models of two-phase incompressible flows D Han, N Jiang Applied Mathematics Letters 108, 106521, 2020 | 2 | 2020 |

Boundary layers for the subcritical modes of the 3D primitive equations in a cube M Hamouda, D Han, CY Jung, K Tawri, R Temam Journal of Differential Equations 267 (1), 61-96, 2019 | 2 | 2019 |

Dynamic Transitions and Bifurcations for a Class of Axisymmetric Geophysical Fluid Flow D Han, M Hernandez, Q Wang SIAM Journal on Applied Dynamical Systems 20 (1), 38-64, 2021 | 1 | 2021 |