Results 171 to 180 of about 1,147 (198)
A hybrid yang transform adomian decomposition method for solving time-fractional nonlinear partial differential equation. [PDF]
BMC Res NotesBekela AS, Deresse AT.
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An Optimal Homotopy Analysis Transform Method for Handling Nonlinear PDEs
International Journal of Applied and Computational Mathematics, 2022zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Zaid Odibat +2 more
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A novel solution procedure for fuzzy fractional heat equations by homotopy analysis transform method
Neural Computing and Applications, 2012In this paper, we designed a reliable recipe of homotopy analysis method and Laplace decomposition method namely homotopy analysis transform method to solve fuzzy fractional heat and wave equations. This method overcomes the difficulties arise in other analytical method and removes the restrictive condition of nonlinearity and assumptions of small and ...
Ahmed Salah +2 more
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A novel analytical solution of a fractional diffusion problem by homotopy analysis transform method
Neural Computing and Applications, 2012In this study, we present the homotopy analysis transform method for finding solution of fractional diffusion-type equations. We can attain these equations by substituting a first-order time derivative by a fractional-order derivative in regular diffusion equation.
Muhammad Asif Gondal +3 more
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Numerical Algorithms, 2013
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Songxin Liang, Junchi Ma
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Songxin Liang, Junchi Ma
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On the relationship between the homotopy analysis method and Euler transform
Communications in Nonlinear Science and Numerical Simulation, 2010zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Chinese Physics B, 2013
We present a new reliable analytical study for solving the discontinued problems arising in nanotechnology. Such problems are presented as nonlinear differential—difference equations. The proposed method is based on the Laplace transform with the homotopy analysis method (HAM). This method is a powerful tool for solving a large amount of problems. This
M. M. Khader, Sunil Kumar, S. Abbasbandy
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We present a new reliable analytical study for solving the discontinued problems arising in nanotechnology. Such problems are presented as nonlinear differential—difference equations. The proposed method is based on the Laplace transform with the homotopy analysis method (HAM). This method is a powerful tool for solving a large amount of problems. This
M. M. Khader, Sunil Kumar, S. Abbasbandy
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Computational and Applied Mathematics, 2021
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Shehu Maitama, Weidong Zhao
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Shehu Maitama, Weidong Zhao
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Advances in Computational Mathematics, 2016
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Rishi Kumar Pandey +1 more
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Rishi Kumar Pandey +1 more
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International Journal of Theoretical Physics
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Arshad, Muhammad Sarmad +4 more
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Arshad, Muhammad Sarmad +4 more
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