A Potent Collocation Approach Based on Shifted Gegenbauer Polynomials for Nonlinear Time Fractional Burgers’ Equations

Magdy, E.; Abd-Elhameed, W. M.; Youssri, Y. H.; Moatimid, G. M.; Atta, A. G.

doi:10.37256/cm.4420233302

Cited by 3 publications

(3 citation statements)

References 44 publications

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“…Additionally, Hafez, Youssri, and Atta [14] propose a Jacobi Rational Operational Approach for solving time-fractional sub-diffusion equations on a semi-infinite domain, demonstrating the applicability of spectral methods to fractional differential equations. These works, along with the contributions of Magdy et al [15] and Abdelhakem et al [16], collectively underscore the potency and efficacy of spectral methods in solving differential equations of various complexities. For more studies, please see [17][18].…”

Section: Introductionmentioning

confidence: 92%

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Fejér-Quadrature Collocation Algorithm for Solving Fractional Integro-Differential Equations via Fibonacci Polynomials

Youssri,

Atta

2024

Contemp. Math.

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In this article, we introduce a novel spectral algorithm utilizing Fibonacci polynomials to numerically solve both linear and nonlinear integro-differential equations with fractional-order derivatives. Our approach employs a quadrature-collocation method, transforming complex equations and associated conditions into systems of linear or nonlinear algebraic equations. The solutions to these equations, involving unknown coefficients, provide accurate numerical approximations for the original fractional-order equations. To validate the method, we present numerical examples illustrating its robustness and versatility. Comparative analyses with available analytical solutions affirm the reliability and accuracy of our algorithm, establishing its practical utility in addressing fractional-order integro-differential equations. This research contributes to computational mathematics and spectral methods, offering a promising tool for diverse scientific and engineering challenges.

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Section: Introductionmentioning

confidence: 92%

“…Now we apply the quadrature formula (14), to the integral on the right hand side of Eq. ( 13), to get (15) ( )…”

Section: Numerical Solution Of Fractional Integro-differential Equationmentioning

confidence: 99%

Fejér-Quadrature Collocation Algorithm for Solving Fractional Integro-Differential Equations via Fibonacci Polynomials

Youssri,

Atta

2024

Contemp. Math.

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“…However, a wider range of physical issues required more intricate mathematical differentiation operators. Fractional differentiation [21][22][23][24][25][26][27] and the notion of the fractal derivative have been combined to form an innovative differentiation concept. As a result, several mathematicians offered various types of fractional derivatives [28,29].…”

Section: Introductionmentioning

confidence: 99%

A dynamical behavior of the coupled Broer-Kaup-Kupershmidt equation using two efficient analytical techniques

Ansar,

Abbas,

Emadifar

et al. 2024

PLoS ONE

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The aim of the present study is to identify multiple soliton solutions to the nonlinear coupled Broer-Kaup-Kupershmidt (BKK) system, including beta, conformable, local-fractional, and M-truncated derivatives. The coupled Broer-Kaup-Kupershmidt system is employed for modelling nonlinear wave evolution in mathematical models of fluid dynamics, plasmic, optical, dispersive, and nonlinear long-gravity waves. The travelling wave solutions to the above model are found using the Unified and generalised Bernoulli sub-ODE techniques. By modifying certain parameter values, we may create bright soliton, squeezed bell-shaped wave, expanded v-shaped soliton, W-shaped wave, singular soliton, and periodic solutions. The four distinct kinds of derivatives are compared quite effectively using 2D line graphs. Also, contour plots and 3D graphics are given by using Mathematica 10. Lastly, any pair of propagating wave solutions has symmetrical geometrical forms.

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Spectral Collocation Approach with Shifted Chebyshev Third-Kind Series Approximation for Nonlinear Generalized Fractional Riccati Equation

Atta

2024

Int. J. Appl. Comput. Math

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A Potent Collocation Approach Based on Shifted Gegenbauer Polynomials for Nonlinear Time Fractional Burgers’ Equations

Cited by 3 publications

References 44 publications

Fejér-Quadrature Collocation Algorithm for Solving Fractional Integro-Differential Equations via Fibonacci Polynomials

Fejér-Quadrature Collocation Algorithm for Solving Fractional Integro-Differential Equations via Fibonacci Polynomials

A dynamical behavior of the coupled Broer-Kaup-Kupershmidt equation using two efficient analytical techniques

Spectral Collocation Approach with Shifted Chebyshev Third-Kind Series Approximation for Nonlinear Generalized Fractional Riccati Equation

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