| 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 | 335 | 2014 |
| 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 |
| An alternating direction implicit orthogonal spline collocation method for the two dimensional multi-term time fractional integro-differential equation L Qiao, Z Wang, D Xu Applied Numerical Mathematics 151, 199-212, 2020 | 54 | 2020 |
| A high order compact finite difference scheme for time fractional Fokker–Planck equations S Vong, Z Wang Applied Mathematics Letters 43, 38-43, 2015 | 53 | 2015 |
| Second order difference schemes for time-fractional KdV–Burgers’ equation with initial singularity D Cen, Z Wang, Y Mo Applied Mathematics Letters 112, 106829, 2021 | 48 | 2021 |
| A fast linearized finite difference method for the nonlinear multi-term time-fractional wave equation P Lyu, Y Liang, Z Wang Applied Numerical Mathematics 151, 448-471, 2020 | 48 | 2020 |
| Sharp error estimate of a compact L1-ADI scheme for the two-dimensional time-fractional integro-differential equation with singular kernels Z Wang, D Cen, Y Mo Applied Numerical Mathematics 159, 190-203, 2021 | 47 | 2021 |
| 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, 1165-1682, 2016 | 42 | 2016 |
| A high-order exponential ADI scheme for two dimensional time fractional convection–diffusion equations Z Wang, S Vong Computers & Mathematics with Applications 68, 185-196, 2014 | 40 | 2014 |
| An ADI difference scheme based on fractional trapezoidal rule for fractional integro-differential equation with a weakly singular kernel L Qiao, D Xu, Z Wang Applied Mathematics and Computation 354, 103-114, 2019 | 36 | 2019 |
| 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 | 36 | 2014 |
| A high‐order compact scheme for the nonlinear fractional K lein–G ordon equation S Vong, Z Wang Numerical Methods for Partial Differential Equations 31 (3), 706-722, 2015 | 35 | 2015 |
| Time two-grid technique combined with temporal second order difference method for two-dimensional semilinear fractional sub-diffusion equations D Cen, Z Wang Applied Mathematics Letters 129, 107919, 2022 | 34 | 2022 |
| A high order ADI scheme for the two-dimensional time fractional diffusion-wave equation Z Wang, S Vong International Journal of Computer Mathematics, 2014 | 34* | 2014 |
| Mathematical analysis and numerical methods for Caputo-Hadamard fractional diffusion-wave equations C Ou, D Cen, S Vong, Z Wang Applied Numerical Mathematics 177, 34-57, 2022 | 31 | 2022 |
| Fast high order difference schemes for the time fractional telegraph equation Y Liang, Z Yao, Z Wang Numerical Methods for Partial Differential Equations 36, 154-172, 2019 | 31 | 2019 |
| A second-order scheme with nonuniform time grids for Caputo–Hadamard fractional sub-diffusion equations Z Wang, C Ou, S Vong Journal of Computational and Applied Mathematics 414, 114448, 2022 | 28 | 2022 |
| Finite difference schemes for two-dimensional time-space fractional differential equations Z Wang, S Vong, SL Lei International Journal of Computer Mathematics 93 (3), 578-595, 2016 | 25 | 2016 |
| High order difference schemes for a time fractional differential equation with Neumann boundary conditions S Vong, Z Wang East Asian Journal on Applied Mathematics 4, 222-241, 2014 | 25 | 2014 |
Seak Weng VongUniversity of Macau在 umac.mo 的电子邮件经过验证
