| A space-time spectral order sinc-collocation method for the fourth-order nonlocal heat model arising in viscoelasticity X Yang, L Wu, H Zhang Applied Mathematics and Computation 457, 128192, 2023 | 101 | 2023 |
| Orthogonal spline collocation method for the two-dimensional fractional sub-diffusion equation X Yang, H Zhang, D Xu Journal of Computational Physics 256, 824-837, 2014 | 62 | 2014 |
| Crank–Nicolson/quasi-wavelets method for solving fourth order partial integro-differential equation with a weakly singular kernel X Yang, D Xu, H Zhang Journal of Computational Physics 234, 317-329, 2013 | 62 | 2013 |
| Quintic B-spline collocation method for fourth order partial integro-differential equations with a weakly singular kernel H Zhang, X Han, X Yang Applied Mathematics and Computation 219 (12), 6565-6575, 2013 | 61 | 2013 |
| An ADI Crank–Nicolson orthogonal spline collocation method for the two-dimensional fractional diffusion-wave equation G Fairweather, X Yang, D Xu, H Zhang Journal of Scientific Computing 65, 1217-1239, 2015 | 49 | 2015 |
| An efficient ADI difference scheme for the nonlocal evolution problem in three-dimensional space H Zhang, Y Liu, X Yang Journal of Applied Mathematics and Computing 69 (1), 651-674, 2023 | 48 | 2023 |
| On conservative, positivity preserving, nonlinear FV scheme on distorted meshes for the multi-term nonlocal Nagumo-type equations X Yang, Z Zhang Applied Mathematics Letters 150, 108972, 2024 | 45 | 2024 |
| A robust error analysis of the OSC method for a multi-term fourth-order sub-diffusion equation H Zhang, X Yang, Q Tang, D Xu Computers & Mathematics with Applications 109, 180-190, 2022 | 45 | 2022 |
| Simple positivity-preserving nonlinear finite volume scheme for subdiffusion equations on general non-conforming distorted meshes X Yang, H Zhang, Q Zhang, G Yuan Nonlinear Dynamics 108 (4), 3859-3886, 2022 | 42 | 2022 |
| Discrete-time orthogonal spline collocation method with application to two-dimensional fractional cable equation H Zhang, X Yang, X Han Computers & Mathematics with Applications 68 (12), 1710-1722, 2014 | 39 | 2014 |
| Quasi-wavelet based numerical method for fourth-order partial integro-differential equations with a weakly singular kernel X Yang, D Xu, H Zhang International Journal of Computer Mathematics 88 (15), 3236-3254, 2011 | 39 | 2011 |
| An implicit robust numerical scheme with graded meshes for the modified Burgers model with nonlocal dynamic properties Q Tian, X Yang, H Zhang, D Xu Computational and Applied Mathematics 42 (6), 246, 2023 | 38 | 2023 |
| The uniform l1 long-time behavior of time discretization for time-fractional partial differential equations with nonsmooth data X Yang, H Zhang Applied Mathematics Letters 124, 107644, 2022 | 38 | 2022 |
| A high-order and efficient numerical technique for the nonlocal neutron diffusion equation representing neutron transport in a nuclear reactor W Wang, H Zhang, X Jiang, X Yang Annals of Nuclear Energy 195, 110163, 2024 | 35 | 2024 |
| A high-order numerical method for solving the 2D fourth-order reaction-diffusion equation H Zhang, X Yang, D Xu Numerical Algorithms 80, 849-877, 2019 | 33 | 2019 |
| Second-order BDF ADI Galerkin finite element method for the evolutionary equation with a nonlocal term in three-dimensional space X Yang, W Qiu, H Chen, H Zhang Applied Numerical Mathematics 172, 497-513, 2022 | 31 | 2022 |
| An efficient alternating direction implicit finite difference scheme for the three-dimensional time-fractional telegraph equation X Yang, W Qiu, H Zhang, L Tang Computers & Mathematics with Applications 102, 233-247, 2021 | 31 | 2021 |
| WSGD-OSC scheme for two-dimensional distributed order fractional reaction–diffusion equation X Yang, H Zhang, D Xu Journal of Scientific Computing 76 (3), 1502-1520, 2018 | 29 | 2018 |
| A backward euler orthogonal spline collocation method for the time‐fractional F okker–P lanck equation G Fairweather, H Zhang, X Yang, D Xu Numerical Methods for Partial Differential Equations 31 (5), 1534-1550, 2015 | 29 | 2015 |
| The finite volume scheme preserving maximum principle for two-dimensional time-fractional Fokker–Planck equations on distorted meshes X Yang, H Zhang, Q Zhang, G Yuan, Z Sheng Applied Mathematics Letters 97, 99-106, 2019 | 28 | 2019 |
Da XuHunan Normal UniversityEmail yang diverifikasi di hunnu.edu.cn