Compact difference schemes for the modified anomalous fractional sub-diffusion equation and the fractional diffusion-wave equation Z Wang, S Vong Journal of Computational Physics 277, 1-15, 2014 | 336 | 2014 |

Compressible Navier–Stokes equations with degenerate viscosity coefficient and vacuum (II) SW Vong, T Yang, C Zhu Journal of Differential Equations 192 (2), 475-501, 2003 | 127 | 2003 |

The tensor splitting with application to solve multi-linear systems D Liu, W Li, SW Vong Journal of Computational and Applied Mathematics 330, 75-94, 2018 | 101 | 2018 |

A compact difference scheme for a two dimensional fractional Klein–Gordon equation with Neumann boundary conditions S Vong, Z Wang Journal of Computational Physics 274, 268-282, 2014 | 84 | 2014 |

High order finite difference method for time-space fractional differential equations with Caputo and Riemann-Liouville derivatives S Vong, P Lyu, X Chen, SL Lei Numerical Algorithms 72, 195-210, 2016 | 82 | 2016 |

Positive solutions of singular fractional differential equations with integral boundary conditions SW Vong Mathematical and Computer Modelling 57 (5-6), 1053-1059, 2013 | 73 | 2013 |

A relaxation modulus-based matrix splitting iteration method for solving linear complementarity problems H Zheng, W Li, S Vong Numerical Algorithms 74, 137-152, 2017 | 71 | 2017 |

Tensor complementarity problems: the GUS-property and an algorithm D Liu, W Li, SW Vong Linear and Multilinear Algebra 66 (9), 1726-1749, 2018 | 68 | 2018 |

Error bounds for linear complementarity problems of *MB*-matricesT Chen, W Li, X Wu, S Vong Numerical Algorithms 70, 341-356, 2015 | 59 | 2015 |

Comparison results for splitting iterations for solving multi-linear systems W Li, D Liu, SW Vong Applied Numerical Mathematics 134, 105-121, 2018 | 57 | 2018 |

*Z*-eigenpair bounds for an irreducible nonnegative tensorW Li, D Liu, SW Vong Linear Algebra and its Applications 483, 182-199, 2015 | 54 | 2015 |

Proof of Böttcher and Wenzel's conjecture SW Vong, XQ Jin | 53 | 2008 |

A high order compact finite difference scheme for time fractional Fokker–Planck equations S Vong, Z Wang Applied Mathematics Letters 43, 38-43, 2015 | 52 | 2015 |

A high-order method with a temporal nonuniform mesh for a time-fractional Benjamin–Bona–Mahony equation P Lyu, S Vong Journal of Scientific Computing 80 (3), 1607-1628, 2019 | 49 | 2019 |

A compact difference scheme for fractional sub-diffusion equations with the spatially variable coefficient under Neumann boundary conditions S Vong, P Lyu, Z Wang Journal of Scientific Computing 66, 725-739, 2016 | 47 | 2016 |

Fully discrete local discontinuous Galerkin methods for some time-fractional fourth-order problems L Guo, Z Wang, S Vong International Journal of Computer Mathematics 93 (10), 1665-1682, 2016 | 44 | 2016 |

A high-order exponential ADI scheme for two dimensional time fractional convection–diffusion equations Z Wang, S Vong Computers & Mathematics with Applications 68 (3), 185-196, 2014 | 40 | 2014 |

Compact finite difference scheme for the fourth-order fractional subdiffusion system S Vong, Z Wang Advances in Applied Mathematics and Mechanics 6 (4), 419-435, 2014 | 39 | 2014 |

Circulant and skew-circulant splitting iteration for fractional advection–diffusion equations W Qu, SL Lei, SW Vong International Journal of Computer Mathematics 91 (10), 2232-2242, 2014 | 36 | 2014 |

On convergence of the modulus-based matrix splitting iteration method for horizontal linear complementarity problems of H+-matrices H Zheng, S Vong Applied Mathematics and Computation 369, 124890, 2020 | 35 | 2020 |