A high order accurate bound-preserving compact finite difference scheme for scalar convection diffusion equations H Li, S Xie, X Zhang SIAM Journal on Numerical Analysis 56 (6), 3308-3345, 2018 | 26 | 2018 |
On the monotonicity and discrete maximum principle of the finite difference implementation of - finite element method H Li, X Zhang Numerische Mathematik 145 (2), 437-472, 2020 | 24 | 2020 |
Superconvergence of high order finite difference schemes based on variational formulation for elliptic equations H Li, X Zhang Journal of Scientific Computing 82 (2), 36, 2020 | 24 | 2020 |
Accuracy of Spectral Element Method for Wave, Parabolic, and Schrödinger Equations H Li, D Appelö, X Zhang SIAM Journal on Numerical Analysis 60 (1), 339-363, 2022 | 17 | 2022 |
Superconvergence of - Finite Element Method for Elliptic Equations with Approximated Coefficients H Li, X Zhang Journal of Scientific Computing 82 (1), 1-28, 2020 | 7 | 2020 |
A high order accurate bound-preserving compact finite difference scheme for two-dimensional incompressible flow H Li, X Zhang Communications on Applied Mathematics and Computation 6 (1), 113-141, 2024 | 4 | 2024 |
Accuracy and monotonicity of spectral element method on structured meshes H Li Purdue University, 2021 | 3 | 2021 |
A monotone finite element method for anisotropic elliptic equations H Li, X Zhang arXiv preprint arXiv:2310.16274, 2023 | 2 | 2023 |