| Convergence and optimality of adaptive edge finite element methods for time-harmonic Maxwell equations L Zhong, L Chen, S Shu, G Wittum, J Xu Mathematics of Computation 81 (278), 623, 2011 | 71 | 2011 |
| Two-grid methods for Maxwell eigenvalue problems J Zhou, X Hu, L Zhong, S Shu, L Chen SIAM journal on numerical analysis 52 (4), 2027-2047, 2014 | 56 | 2014 |
| Optimal error estimates for Nedelec edge elements for time-harmonic Maxwell's equations L Zhong, S Shu, G Wittum, J Xu J. Comput. Math 27 (5), 563-572, 2009 | 54 | 2009 |
| Two‐grid methods for time‐harmonic Maxwell equations L Zhong, S Shu, J Wang, J Xu Numerical Linear Algebra with Applications 20 (1), 93-111, 2013 | 44 | 2013 |
| Convergence of adaptive edge finite element methods for H(curl)‐elliptic problems L Zhong, S Shu, L Chen, J Xu Numerical Linear Algebra with Applications 17 (2‐3), 415-432, 2010 | 17 | 2010 |
| A-posteriori error analysis for a staggered discontinuous Galerkin discretization of the time-harmonic Maxwell’s equations ET Chung, MC Yuen, L Zhong Applied Mathematics and Computation 237, 613-631, 2014 | 10 | 2014 |
| Two-level additive preconditioners for edge element discretizations of time-harmonic Maxwell equations L Zhong, C Liu, S Shu Computers & Mathematics with Applications 66 (4), 432-440, 2013 | 10 | 2013 |
| Adaptive finite element method and local multigrid method for elasticity problems C Liu, S Shu, Y Xiao, L Zhong Engineering Mechanics 29 (9), 60-67, 2012 | 10 | 2012 |
| Adaptive-multilevel BDDC algorithm for three-dimensional plane wave Helmholtz systems J Peng, S Shu, J Wang, L Zhong Journal of Computational and Applied Mathematics 381, 113011, 2021 | 9 | 2021 |
| Quasi-optimal convergence of adaptive edge finite element methods for three dimensional indefinite time-harmonic Maxwell’s equations L Zhong, L Chen, S Shu, G Wittum, J Xu Report, Department of Mathematics, University of California at Irvine, 2010 | 9 | 2010 |
| Iterative two-grid methods for semilinear elliptic equations W Zhang, R Fan, L Zhong Computers & Mathematics with Applications 80 (3), 522-530, 2020 | 7 | 2020 |
| Convergence of adaptive weak Galerkin finite element methods for second order elliptic problems Y Xie, L Zhong Journal of Scientific Computing 86, 1-25, 2021 | 6 | 2021 |
| An iterative two-grid method of a finite element PML approximation for the two dimensional Maxwell problem C Liu, S Shu, Y Huang, L Zhong, J Wang Advances in Applied Mathematics and Mechanics 4 (2), 175-189, 2012 | 6 | 2012 |
| Preconditioners for higher order edge finite element discretizations of Maxwell’s equations LQ Zhong, S Shu, DD Sun, L Tan Science in China Series A: Mathematics 51 (8), 1537-1548, 2008 | 6 | 2008 |
| Superconvergent gradient recovery for nonlinear Poisson-Nernst-Planck equations with applications to the ion channel problem Y Yang, M Tang, C Liu, B Lu, L Zhong Advances in Computational Mathematics 46, 1-35, 2020 | 5 | 2020 |
| Error estimates of the classical and improved two-gridmethods W Zhang, J Xu, L Zhong Advances in Applied Mathematics and Mechanics 10 (4), 785-796, 2018 | 5 | 2018 |
| Convergence and optimality of an adaptive modified weak Galerkin finite element method X Yingying, S Cao, L Chen, L Zhong Numerical Methods for Partial Differential Equations 39 (5), 3847-3873, 2023 | 4 | 2023 |
| Convergence of an adaptive modified WG method for second-order elliptic problem Y Xie, L Zhong, Y Zeng Numerical Algorithms, 1-20, 2022 | 4 | 2022 |
| Two-grid discontinuous Galerkin method for convection–diffusion–reaction equations L Zhong, Y Xuan, J Cui Journal of Computational and Applied Mathematics 404, 113903, 2022 | 4 | 2022 |
| Two-grid IPDG discretization scheme for nonlinear elliptic PDEs L Zhong, L Zhou, C Liu, J Peng Communications in Nonlinear Science and Numerical Simulation 95, 105587, 2021 | 4 | 2021 |
Jinchao XuProfessor of Mathematics, Penn State UniversityVerified email at psu.edu
