Solution of the Fractional Bratu-Type Equation Via Fractional Residual Power Series Method

Khalouta, Ali; Kadem, Abdelouahab

doi:10.2478/tmmp-2020-0024

Cited by 6 publications

(3 citation statements)

References 16 publications

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“…In 2021, Tariq et al [37] obtained an analytic approximate solution to non-linear temporal conformable fractional foam drainage equation, Kumar et al [20] investigated the approximate analytical solution of fractional Bi-Hamiltonian Boussinesq system, Jena et al [15] investigated time-fractional fuzzy vibration equation of large membranes. Whereas in 2020, Hasan et al [14] introduced a solution for linear time fractional Swift-Hohenberg equation, Khalauta et al [17] presented fractional Bratu-type equation, Dunnimit et al [12] gave analytic approach to deal with fractional logistic equations.…”

Section: Introductionmentioning

confidence: 99%

Solution of fractional modified Kawahara equation: a semi-analytic approach

Khirsariya,

Rao,

Chauhan

2023

Math Appl Sci Eng

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The present study examines a semi-analytical method known as the Fractional Residual Power Series Method for obtaining solutions to the non-linear, time-fractional Kawahara and modified Kawahara equations. These equations are fifth-order, non-linear partial differential equations that arise in the context of shallow water waves. The analytical process and findings are compared with those obtained from the well-known Variational Iteration Method (VIM) and Homotopy Perturbation Method (HPM). The results obtained from the Fractional Residual Power Series Method are found to be more efficient, reliable, and easier to implement compared to other analytical and semi-analytical methods.

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Section: Introductionmentioning

confidence: 99%

Solution of fractional modified Kawahara equation: a semi-analytic approach

Khirsariya,

Rao,

Chauhan

2023

Math Appl Sci Eng

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“…Obtaining approximate analytical solutions of the NFPDEs is one of the very important subjects in mathematics, science and technology. For this purpose, many different numerical and analytical methods have been constructed and developed, among them are: modification of Adomian decomposition method (MADM) [16], variational iteration method (VIM) [17], homotopy analysis method (HAM) [18], homotopy perturbation transform method (HPTM) [19], new iterative method (NIM) [20], fractional Elzaki projected differential transform method (FEPDTM) [21], generalized differential transform method (GDTM) [22], modification of the reduced differential transform method (MRDTM) [23], fractional Taylor operational matrix method (FTOMM) [24], fractional residual power series method (FRPSM) [25].…”

Section: Introductionmentioning

confidence: 99%

A new approximate analytical method and its convergence for nonlinear time-fractional partial differential equations

Khalouta

Kadem

2021

Scientia Iranica

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The main goal of this paper is to present a new approximate analytical method called modified generalized Taylor fractional series method (MGTFSM) for solving general nonlinear time-fractional partial differential equations. The fractional derivative is considered in the Caputo sense. We establish the convergence results of the proposed method. The basic idea of the MGTFSM is to construct the solution in the form of infinite series which converges rapidly to the exact solution of the given problem. The main advantage of the proposed method compare to current methods is that method solves the nonlinear problems without using linearization, discretization, perturbation or any other restriction. The efficiency and accuracy of the MGTFSM is tested by means of different numerical examples. The results prove that the proposed method is very effective and simple for solving the nonlinear time-fractional partial differential equations problems.

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“…Lakshman and Senthilkumar [8], Dzhalladova and Růžičková [9], Sadani [10] have done the stability analysis of functional differential equations. Khalouta and Kade [11] have studied the solution of the fractional bratu-type equation by fractional residual power series method. Deng et al [12], Čermák et al [13], Sawoor [14] and Chartubapan et al [15] have done the stability analysis of fractional differential equations.…”

Section: Introductionmentioning

confidence: 99%