| A high-order compact finite difference scheme for the fractional sub-diffusion equation C Ji, Z Sun Journal of Scientific Computing 64, 959-985, 2015 | 115 | 2015 |
| Fast iterative method with a second-order implicit difference scheme for time-space fractional convection–diffusion equation XM Gu, TZ Huang, CC Ji, B Carpentieri, AA Alikhanov Journal of Scientific Computing 72, 957-985, 2017 | 112 | 2017 |
| Numerical algorithms with high spatial accuracy for the fourth-order fractional sub-diffusion equations with the first Dirichlet boundary conditions C Ji, Z Sun, Z Hao Journal of Scientific Computing 66, 1148-1174, 2016 | 47 | 2016 |
| The high-order compact numerical algorithms for the two-dimensional fractional sub-diffusion equation C Ji, Z Sun Applied Mathematics and Computation 269, 775-791, 2015 | 28 | 2015 |
| A new analytical technique of the L-type difference schemes for time fractional mixed sub-diffusion and diffusion-wave equations Z Sun, C Ji, R Du Applied Mathematics Letters 102, 106115, 2020 | 25 | 2020 |
| Numerical schemes for solving the time-fractional dual-phase-lagging heat conduction model in a double-layered nanoscale thin film C Ji, W Dai, Z Sun Journal of Scientific Computing 81, 1767-1800, 2019 | 25 | 2019 |
| Numerical method for solving the time-fractional dual-phase-lagging heat conduction equation with the temperature-jump boundary condition C Ji, W Dai, Z Sun Journal of Scientific Computing 75, 1307-1336, 2018 | 23 | 2018 |
| An unconditionally stable and high-order convergent difference scheme for Stokes’ first problem for a heated generalized second grade fluid with fractional derivative C Ji, Z Sun Numerical Mathematics: Theory, Methods and Applications 10 (3), 597-613, 2017 | 13 | 2017 |
| Numerical algorithm with fourth-order spatial accuracy for solving the time-fractional dual-phase-lagging nanoscale heat conduction equation CC Ji, W Dai Numer. Math. Theor. Meth. Appl 16, 511-540, 2023 | 5 | 2023 |
| Stability and convergence of difference schemes for multi-dimensional parabolic equations with variable coefficients and mixed derivatives C Ji, R Du, Z Sun International Journal of Computer Mathematics 95 (1), 255-277, 2018 | 5 | 2018 |
| Numerical method for solving the fractional evolutionary model of bi-flux diffusion processes CC Ji, W Qu, M Jiang International Journal of Computer Mathematics 100 (4), 880-900, 2023 | 3 | 2023 |
| A finite difference method for solving the wave equation with fractional damping M Cui, CC Ji, W Dai Mathematical and Computational Applications 29 (1), 2, 2023 | 1 | 2023 |
| Fast iterative method with a second order implicit difference scheme for time-space fractional reaction–diffusion equations XM Gu, TZ Huang, CC Ji, B Carpentieri, AA Alikhanov | 1 | 2016 |
| A new variable-order fractional momentum operator for wave absorption when solving Schrödinger equations JP Wilson, CC Ji, W Dai Journal of Computational Physics 511, 113123, 2024 | | 2024 |
| A FRACTIONAL-ORDER ALTERNATIVE FOR PHASE-LAGGING EQUATION. CUICUI JI, W DAI, RE MICKENS International Journal of Numerical Analysis & Modeling 20 (3), 2023 | | 2023 |
| Sub-Diffusion Two-Temperature Model and Accurate Numerical Scheme for Heat Conduction Induced by Ultrashort-Pulsed Laser Heating C Ji, W Dai Fractal and Fractional 7 (4), 319, 2023 | | 2023 |
| A second order implicit difference scheme for time-space fractional convection-diffusion equations XM Gu, TZ Huang, CC Ji, B Carpentieri, AA Alikhanov arXiv preprint arXiv:1603.00279, 2016 | | 2016 |
Weizhong DaiProfessor of Mathematics, Louisiana Tech University在 latech.edu 的电子邮件经过验证
