Maximum principle preserving exponential time differencing schemes for the nonlocal Allen-Cahn equation Q Du, L Ju, X Li, Z Qiao SIAM Journal on Numerical Analysis 57 (2), 875-898, 2019 | 189 | 2019 |
Maximum bound principles for a class of semilinear parabolic equations and exponential time-differencing schemes Q Du, L Ju, X Li, Z Qiao SIAM Review 63 (2), 317-359, 2021 | 164 | 2021 |
Energy stability and error estimates of exponential time differencing schemes for the epitaxial growth model without slope selection L Ju, X Li, Z Qiao, H Zhang Mathematics of Computation 87 (312), 1859-1885, 2018 | 108 | 2018 |
Stabilized linear semi-implicit schemes for the nonlocal Cahn–Hilliard equation Q Du, L Ju, X Li, Z Qiao Journal of Computational Physics 363, 39-54, 2018 | 94 | 2018 |
Maximum bound principle preserving integrating factor Runge–Kutta methods for semilinear parabolic equations L Ju, X Li, Z Qiao, J Yang Journal of Computational Physics 439, 110405, 2021 | 59 | 2021 |
Convergence of a fast explicit operator splitting method for the epitaxial growth model with slope selection X Li, Z Qiao, H Zhang SIAM Journal on Numerical Analysis 55 (1), 265-285, 2017 | 54 | 2017 |
Stabilized integrating factor Runge-Kutta method and unconditional preservation of maximum bound principle J Li, X Li, L Ju, X Feng SIAM Journal on Scientific Computing 43 (3), A1780-A1802, 2021 | 53 | 2021 |
Convergence analysis for a stabilized linear semi-implicit numerical scheme for the nonlocal Cahn-Hilliard equation X Li, Z Qiao, C Wang Mathematics of Computation 90 (327), 171-188, 2021 | 49 | 2021 |
Generalized SAV-exponential integrator schemes for Allen-Cahn type gradient flows L Ju, X Li, Z Qiao SIAM Journal on Numerical Analysis 60, 1905-1931, 2022 | 37 | 2022 |
Phase transitions of macromolecular microsphere composite hydrogels based on the stochastic Cahn–Hilliard equation X Li, G Ji, H Zhang Journal of Computational Physics 283, 81-97, 2015 | 33 | 2015 |
Stabilized exponential-SAV schemes preserving energy dissipation law and maximum bound principle for the Allen-Cahn type equations L Ju, X Li, Z Qiao Journal of Scientific Computing 92, 66, 2022 | 32 | 2022 |
An unconditionally energy stable finite difference scheme for a stochastic Cahn-Hilliard equation X Li, ZH Qiao, H Zhang Science China Mathematics 59, 1815-1834, 2016 | 32 | 2016 |
Convergence analysis of exponential time differencing schemes for the Cahn-Hilliard equation X Li, L Ju, X Meng Communications in Computational Physics 26, 1510-1529, 2019 | 26 | 2019 |
A second-order convex splitting scheme for a Cahn-Hilliard equation with variable interfacial parameters X Li, Z Qiao, H Zhang Journal of Computational Mathematics 35 (6), 693-710, 2017 | 24 | 2017 |
Unconditionally stable exponential time differencing schemes for the mass‐conserving Allen–Cahn equation with nonlocal and local effects K Jiang, L Ju, J Li, X Li Numerical Methods for Partial Differential Equations 38, 1636-1657, 2022 | 21 | 2022 |
A space-time adaptive finite element method with exponential time integrator for the phase field model of pitting corrosion H Gao, L Ju, X Li, R Duddu Journal of Computational Physics 406, 109191, 2020 | 17 | 2020 |
Stabilization parameter analysis of a second-order linear numerical scheme for the nonlocal Cahn–Hilliard equation X Li, Z Qiao, C Wang IMA Journal of Numerical Analysis 43 (2), 1089-1114, 2023 | 12 | 2023 |
Overlapping domain decomposition based exponential time differencing methods for semilinear parabolic equations X Li, L Ju, TTP Hoang BIT Numerical Mathematics 61, 1-36, 2021 | 8 | 2021 |
NA 序列重对数律的几个极限定理 张立新 数学学报: 中文版 47 (3), 541-552, 2004 | 8 | 2004 |
Double stabilizations and convergence analysis of a second-order linear numerical scheme for the nonlocal Cahn-Hilliard equation X Li, Z Qiao, C Wang Science China Mathematics 67 (1), 187-210, 2024 | 4 | 2024 |