Homotopy perturbation method: a new nonlinear analytical technique
Applied Mathematics and Computation
Editorial: fractional signal processing and applications
Signal Processing - Special issue: Fractional signal processing and applications
Theory and Applications of Fractional Differential Equations, Volume 204 (North-Holland Mathematics Studies)
Fractional calculus applications in signals and systems
Signal Processing - Fractional calculus applications in signals and systems
Fractional order electromagnetics
Signal Processing - Fractional calculus applications in signals and systems
Matrix approach to discrete fractional calculus II: Partial fractional differential equations
Journal of Computational Physics
A review of the decomposition method and some recent results for nonlinear equations
Mathematical and Computer Modelling: An International Journal
New solutions for some time fractional differential equations
International Journal of Computing Science and Mathematics
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Numerical methods are used to find exact solution for the nonlinear differential equations. In the last decades Iterative methods have been used for solving fractional differential equations. In this paper, the Homotopy perturbation method has been successively applied for finding approximate analytical solutions of the fractional nonlinear Klein-Gordon equation can be used as numerical algorithm. The behavior of solutions and the effects of different values of fractional order @a are shown graphically. Some examples are given to show ability of the method for solving the fractional nonlinear equation.