The following publications are possibly variants of this publication:
- A Compact Difference Scheme for Time Fractional Diffusion Equation with Neumann Boundary ConditionsJianfei Huang, Yifa Tang, Wenjia Wang, Jiye Yang. asiasim 2012: 273-284 [doi]
- A compact difference scheme for a two dimensional nonlinear fractional Klein-Gordon equation in polar coordinatesZhibo Wang, Seakweng Vong. cma, 71(12):2524-2540, 2016. [doi]
- A Compact Difference Scheme for Fractional Sub-diffusion Equations with the Spatially Variable Coefficient Under Neumann Boundary ConditionsSeakweng Vong, Pin Lyu, Zhibo Wang. jscic, 66(2):725-739, 2016. [doi]
- A high-order compact difference method for fractional sub-diffusion equations with variable coefficients and nonhomogeneous Neumann boundary conditionsYuan-Ming Wang. cam, 39(1), 2020. [doi]
- Structure-preserving algorithms for the two-dimensional sine-Gordon equation with Neumann boundary conditionsWenjun Cai, Chaolong Jiang, Yushun Wang, Yongzhong Song. jcphy, 395:166-185, 2019. [doi]
- Convergence of an efficient and compact finite difference scheme for the Klein-Gordon-Zakharov equationTingchun Wang, Luming Zhang, Yong Jiang. amc, 221:433-443, 2013. [doi]