Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by Crossref.
Vong, Seakweng
and
Wang, Zhibo
2014.
A compact difference scheme for a two dimensional fractional Klein–Gordon equation with Neumann boundary conditions.
Journal of Computational Physics,
Vol. 274,
Issue. ,
p.
268.
Wang, Zhibo
and
Vong, Seakweng
2014.
A high-order exponential ADI scheme for two dimensional time fractional convection–diffusion equations.
Computers & Mathematics with Applications,
Vol. 68,
Issue. 3,
p.
185.
Vong, Seakweng
and
Wang, Zhibo
2014.
Compact Finite Difference Scheme for the Fourth-Order Fractional Subdiffusion System.
Advances in Applied Mathematics and Mechanics,
Vol. 6,
Issue. 4,
p.
419.
Ren, Jincheng
and
Gao, Guang-hua
2015.
Efficient and stable numerical methods for the two-dimensional fractional Cattaneo equation.
Numerical Algorithms,
Vol. 69,
Issue. 4,
p.
795.
Vong, Seakweng
and
Wang, Zhibo
2015.
A compact ADI scheme for the two dimensional time fractional diffusion-wave equation in polar coordinates.
Numerical Methods for Partial Differential Equations,
Vol. 31,
Issue. 5,
p.
1692.
Wang, Yuan-Ming
2015.
A compact finite difference method for a class of time fractional convection-diffusion-wave equations with variable coefficients.
Numerical Algorithms,
Vol. 70,
Issue. 3,
p.
625.
Vong, Seakweng
and
Wang, Zhibo
2015.
A high‐order compact scheme for the nonlinear fractional Klein–Gordon equation.
Numerical Methods for Partial Differential Equations,
Vol. 31,
Issue. 3,
p.
706.
Zhao, Xuan
and
Sun, Zhi-Zhong
2015.
Compact Crank–Nicolson Schemes for a Class of Fractional Cattaneo Equation in Inhomogeneous Medium.
Journal of Scientific Computing,
Vol. 62,
Issue. 3,
p.
747.
Aguilar, J. F. Gómez
Córdova-Fraga, T.
Tórres-Jiménez, J.
Escobar-Jiménez, R. F.
Olivares-Peregrino, V. H.
and
Guerrero-Ramírez, G. V.
2016.
Nonlocal Transport Processes and the Fractional Cattaneo-Vernotte Equation.
Mathematical Problems in Engineering,
Vol. 2016,
Issue. ,
p.
1.
Wang, Zhibo
and
Vong, Seakweng
2016.
A compact difference scheme for a two dimensional nonlinear fractional Klein–Gordon equation in polar coordinates.
Computers & Mathematics with Applications,
Vol. 71,
Issue. 12,
p.
2524.
Liu, Zhengguang
Cheng, Aijie
and
Li, Xiaoli
2017.
A second order Crank–Nicolson scheme for fractional Cattaneo equation based on new fractional derivative.
Applied Mathematics and Computation,
Vol. 311,
Issue. ,
p.
361.
Li, Xiaoli
Rui, Hongxing
and
Liu, Zhengguang
2018.
A block‐centered finite difference method for fractional Cattaneo equation.
Numerical Methods for Partial Differential Equations,
Vol. 34,
Issue. 1,
p.
296.
Sun, Hong
Zhao, Xuan
and
Sun, Zhi-zhong
2019.
The Temporal Second Order Difference Schemes Based on the Interpolation Approximation for the Time Multi-term Fractional Wave Equation.
Journal of Scientific Computing,
Vol. 78,
Issue. 1,
p.
467.
Li, Hui
Jiang, Wei
and
Li, Wenya
2019.
Space-time spectral method for the Cattaneo equation with time fractional derivative.
Applied Mathematics and Computation,
Vol. 349,
Issue. ,
p.
325.
Wang, Yuan-Ming
2019.
A Crank-Nicolson-type compact difference method and its extrapolation for time fractional Cattaneo convection-diffusion equations with smooth solutions.
Numerical Algorithms,
Vol. 81,
Issue. 2,
p.
489.
Li, Haonan
Lü, Shujuan
and
Xu, Tao
2019.
A fully discrete spectral method for fractional Cattaneo equation based on Caputo–Fabrizo derivative.
Numerical Methods for Partial Differential Equations,
Vol. 35,
Issue. 3,
p.
936.
Liang, Yuxiang
Yao, Zhongsheng
and
Wang, Zhibo
2020.
Fast high order difference schemes for the time fractional telegraph equation.
Numerical Methods for Partial Differential Equations,
Vol. 36,
Issue. 1,
p.
154.
Lyu, Pin
and
Vong, Seakweng
2020.
A nonuniform L2 formula of Caputo derivative and its application to a fractional Benjamin–Bona–Mahony‐type equation with nonsmooth solutions.
Numerical Methods for Partial Differential Equations,
Vol. 36,
Issue. 3,
p.
579.
Huang, Yating
and
Yin, Zhe
2020.
The Compact Finite Difference Method of Two-Dimensional Cattaneo Model.
Journal of Function Spaces,
Vol. 2020,
Issue. ,
p.
1.
Nikan, O.
Avazzadeh, Z.
and
Tenreiro Machado, J.A.
2021.
Numerical approach for modeling fractional heat conduction in porous medium with the generalized Cattaneo model.
Applied Mathematical Modelling,
Vol. 100,
Issue. ,
p.
107.