Pell Collocation Method for Solving the Nonlinear Time–Fractional Partial Integro–Differential Equation with a Weakly Singular Kernel

Pell Collocation Method for Solving the Nonlinear Time–Fractional Partial Integro–Differential Equation with a Weakly Singular Kernel

This article focuses on finding the numerical solution of the nonlinear time–fractional partial integro–differential equation. For this purpose, we use the operational matrices based on Pell polynomials to approximate fractional Caputo derivative, nonlinear, and integro–differential terms; and by co...

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Veröffentlicht in:Journal of function spaces 2022-05, Vol.2022, p.1-15
Hauptverfasser: Taghipour, M., Aminikhah, H.
Format: Artikel
Sprache:eng
Schlagworte:
Approximation
Collocation methods
Control theory
Differential equations
Error analysis
Mathematical functions
Methods
Nonlinear equations
Nonlinear systems
Numerical analysis
Partial differential equations
Polynomials
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Zusammenfassung:This article focuses on finding the numerical solution of the nonlinear time–fractional partial integro–differential equation. For this purpose, we use the operational matrices based on Pell polynomials to approximate fractional Caputo derivative, nonlinear, and integro–differential terms; and by collocation points, we transform the problem to a system of nonlinear equations. This nonlinear system can be solved by the fsolve command in Matlab. The method’s stability and convergence have been studied. Also included are five numerical examples to demonstrate the veracity of the suggested strategy.
ISSN:2314-8896
2314-8888
DOI:10.1155/2022/8063888