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A Novel Numerical Approach in Solving Fractional Neutral Pantograph Equations via the ARA Integral Transform

Aliaa Burqan, Rania Saadeh, Ahmad Qazza

2021Symmetry32 citationsDOIOpen Access PDF

Abstract

In this article, a new, attractive method is used to solve fractional neutral pantograph equations (FNPEs). The proposed method, the ARA-Residual Power Series Method (ARA-RPSM), is a combination of the ARA transform and the residual power series method and is implemented to construct series solutions for dispersive fractional differential equations. The convergence analysis of the new method is proven and shown theoretically. To validate the simplicity and applicability of this method, we introduce some examples. For measuring the accuracy of the method, we make a comparison with other methods, such as the Runge–Kutta, Chebyshev polynomial, and variational iterative methods. Finally, the numerical results are demonstrated graphically.

Topics & Concepts

ResidualMathematicsConvergence (economics)Applied mathematicsPower seriesSeries (stratigraphy)Iterative methodFractional calculusIntegral equationPolynomialMethod of mean weighted residualsComputer scienceMathematical analysisAlgorithmFinite element methodBiologyEconomic growthThermodynamicsGalerkin methodPhysicsPaleontologyEconomicsFractional Differential Equations SolutionsDifferential Equations and Numerical MethodsMathematical functions and polynomials