Title of article
A pseudospectral Sinc method for numerical investigation of the nonlinear time-fractional Klein-Gordon and sine-Gordon equations
Author/Authors
Taherkhani ، Shima Department of Mathematics - Islamic Azad University, Qazvin Branch , Najafi Khalilsaraye ، Iraj Department of Mathematics - Islamic Azad University, Qazvin Branch , Ghayebi ، Bakhtiyar Department of Mathematics - Islamic Azad University, Qazvin Branch
From page
357
To page
368
Abstract
In this paper, a pseudospectral method is proposed for solving the nonlinear time-fractional Klein-Gordon and sine-Gordon equations. The method is based on the Sinc operational matrices. A finite difference scheme is used to discretize the Caputo time-fractional derivative, while the spatial derivatives are approximated by the Sinc method. The convergence of the full discretization of the problem is studied. Some numerical examples are presented to confirm the accuracy and efficiency of the proposed method. The numerical results are compared with the analytical solution and the reported results in the literature.
Keywords
Fractional differential equation , Nonlinear Klein , Gordon and sine , Gordon equations , Sinc operational matrices , Pseudospectral method , Convergence
Journal title
Computational Methods for Differential Equations
Journal title
Computational Methods for Differential Equations
Record number
2738828
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