Tingchun Wang
Nanjing University of Information Science and Technology
H-index: 21
Asia-China
Top articles of Tingchun Wang
Title | Journal | Author(s) | Publication Date |
---|---|---|---|
Error estimates of a regularized finite difference method for the Logarithmic Schr\"{o} dinger equation with Dirac delta potential | SIAM Journal on Numerical Analysis | Weizhu Bao Rémi Carles Chunmei Su Qinglin Tang | 2019 |
A second-order finite difference scheme for the multi-dimensional nonlinear time-fractional Schrödinger equation | Numerical Algorithms | Jianfeng Liu Tingchun Wang Teng Zhang | 2023/2 |
A mass‐and energy‐preserving numerical scheme for solving coupled Gross–Pitaevskii equations in high dimensions | Numerical Methods for Partial Differential Equations | Jianfeng Liu Qinglin Tang Tingchun Wang | 2023/11 |
Unconditional optimal error estimates of conservative methods for Klein–Gordon–Dirac system in two dimensions | Applied Numerical Mathematics | Tingchun Wang Yue Cheng Lihai Ji | 2023/1/1 |
A New Framework of Convergence Analysis for Solving the General Nonlinear Schr o? dinger Equation using the Fourier Pseudo-Spectral Method in Two Dimensions | ADVANCES IN APPLIED MATHEMATICS AND MECHANICS | Jialing Wang Tingchun Wang Yushun Wang | 2023/6/1 |
Optimal point-wise error estimates of two conservative finite difference schemes for the coupled Gross–Pitaevskii equations with angular momentum rotation terms | Journal of Computational and Applied Mathematics | Tingchun Wang Tingfeng Wang | 2023/6/1 |
Two energy-preserving Fourier pseudo-spectral methods and error estimate for the Klein–Gordon–Dirac system | Communications in Nonlinear Science and Numerical Simulation | Feng Liao Fazhan Geng Tingchun Wang | 2023/4/1 |
Error Estimate of a New Conservative Finite Difference Scheme for the Klein-Gordon-Dirac System | NUMERICAL MATHEMATICS-THEORY METHODS AND APPLICATIONS | Shasha Bian Yue Cheng Boling Guo Tingchun Wang | 2023/2/1 |
A mass and energy conservative fourth-order compact difference scheme for the Klein-Gordon-Dirac equations | Calcolo | Feng Liao Fazhan Geng Tingchun Wang | 2022/3 |
Two energy-preserving compact finite difference schemes for the nonlinear fourth-order wave equation | Communications on Applied Mathematics and Computation | Xiaoyi Liu Tingchun Wang Shilong Jin Qiaoqiao Xu | 2022/12 |
Uniform error bound of a conservative fourth-order compact finite difference scheme for the Zakharov system in the subsonic regime | Advances in Computational Mathematics | Teng Zhang Tingchun Wang | 2022/8 |
A fourth-order compact finite difference scheme for the quantum Zakharov system that perfectly inherits both mass and energy conservation | Computational Simulations and Applications | Wenyuan Liao Jianping Zhu | 2011/10/26 |
An efficient and accurate Fourier pseudo-spectral method for the nonlinear Schrödinger equation with wave operator | International Journal of Computer Mathematics | Shan Li Tingchun Wang Jialing Wang Boling Guo | 2021/2/1 |
An efficient and unconditionally convergent Galerkin finite-element method for the nonlinear Schrödinger equation in high dimensions | Adv. Appl. Math. Mech | Yue Cheng Tingchun Wang Boling Guo | 2021/8 |
Analysis of a conservative fourth-order compact finite difference scheme for the Klein–Gordon–Dirac equation | Computational and Applied Mathematics | Jiyong Li Tingchun Wang | 2021/6 |
Optimal error estimates of fourth‐order compact finite difference methods for the nonlinear Klein–Gordon equation in the nonrelativistic regime | Numerical Methods for Partial Differential Equations | Teng Zhang Tingchun Wang | 2021/5 |
Optimal point-wise error estimate of two conservative fourth-order compact finite difference schemes for the nonlinear Dirac equation | Applied Numerical Mathematics | Jiyong Li Tingchun Wang | 2021/4/1 |
Two energy-conserving and compact finite difference schemes for two-dimensional Schrödinger-Boussinesq equations | Numerical Algorithms | Feng Liao Luming Zhang Tingchun Wang | 2020/12 |
Two completely explicit and unconditionally convergent Fourier pseudo-spectral methods for solving the nonlinear Schrödinger equation | Journal of Computational Physics | Tingchun Wang Jialing Wang Boling Guo | 2020/3/1 |