The exponential scalar auxiliary variable (E-SAV) approach for phase field models and its explicit computing Z Liu, X Li SIAM Journal on Scientific Computing 42 (3), B630-B655, 2020 | 122 | 2020 |

Energy stability and convergence of SAV block-centered finite difference method for gradient flows X Li, J Shen, H Rui Mathematics of Computation 88 (319), 2047-2068, 2019 | 95 | 2019 |

Error analysis of the sav-mac scheme for the Navier--Stokes equations X Li, J Shen SIAM Journal on Numerical Analysis 58 (5), 2465-2491, 2020 | 63 | 2020 |

Stability and error estimates of the SAV Fourier-spectral method for the phase field crystal equation X Li, J Shen Advances in Computational Mathematics 46, 1-20, 2020 | 60 | 2020 |

New SAV-pressure correction methods for the Navier-Stokes equations: stability and error analysis X Li, J Shen, Z Liu Mathematics of Computation 91 (333), 141-167, 2022 | 57 | 2022 |

Efficient modified techniques of invariant energy quadratization approach for gradient flows Z Liu, X Li Applied Mathematics Letters 98, 206-214, 2019 | 51 | 2019 |

Efficient modified stabilized invariant energy quadratization approaches for phase-field crystal equation Z Liu, X Li Numerical Algorithms 85 (1), 107-132, 2020 | 50 | 2020 |

A two-grid block-centered finite difference method for the nonlinear time-fractional parabolic equation X Li, H Rui Journal of scientific computing 72, 863-891, 2017 | 44 | 2017 |

Stability and superconvergence of MAC scheme for Stokes equations on nonuniform grids H Rui, X Li SIAM Journal on Numerical Analysis 55 (3), 1135-1158, 2017 | 40 | 2017 |

A Crank–Nicolson difference scheme for the time variable fractional mobile–immobile advection–dispersion equation Z Liu, X Li Journal of Applied Mathematics and Computing 56 (1), 391-410, 2018 | 39 | 2018 |

A highly efficient and accurate exponential semi-implicit scalar auxiliary variable (ESI-SAV) approach for dissipative system Z Liu, X Li Journal of Computational Physics 447, 110703, 2021 | 36 | 2021 |

On a SAV-MAC scheme for the Cahn–Hilliard–Navier–Stokes phase-field model and its error analysis for the corresponding Cahn–Hilliard–Stokes case X Li, J Shen Mathematical Models and Methods in Applied Sciences 30 (12), 2263-2297, 2020 | 35 | 2020 |

A parallel CGS block-centered finite difference method for a nonlinear time-fractional parabolic equation Z Liu, X Li Computer Methods in Applied Mechanics and Engineering 308, 330-348, 2016 | 34 | 2016 |

Step-by-step solving schemes based on scalar auxiliary variable and invariant energy quadratization approaches for gradient flows Z Liu, X Li Numerical Algorithms, 1-22, 2022 | 33 | 2022 |

A second-order finite difference scheme for quasilinear time fractional parabolic equation based on new fractional derivative Z Liu, A Cheng, X Li International Journal of Computer Mathematics 95 (2), 396-411, 2018 | 30 | 2018 |

Two fast and efficient linear semi-implicit approaches with unconditional energy stability for nonlocal phase field crystal equation Z Liu, X Li Applied Numerical Mathematics 150, 491-506, 2020 | 29 | 2020 |

A novel finite difference discrete scheme for the time fractional diffusion-wave equation Z Liu, A Cheng, X Li Applied Numerical Mathematics 134, 17-30, 2018 | 29 | 2018 |

Block-centered finite difference method for simulating compressible wormhole propagation X Li, H Rui Journal of Scientific Computing 74, 1115-1145, 2018 | 27 | 2018 |

Characteristic block-centred finite difference methods for nonlinear convection-dominated diffusion equation X Li, H Rui International Journal of Computer Mathematics 94 (2), 386-404, 2017 | 25 | 2017 |

The fast scalar auxiliary variable approach with unconditional energy stability for nonlocal Cahn–Hilliard equation Z Liu, X Li Numerical Methods for Partial Differential Equations 37 (1), 244-261, 2021 | 24 | 2021 |