Numerical solution of multiterm variable-order fractional differential equations via shifted Legendre polynomials

Adel A. El-Sayed; Praveen Agarwal

doi:10.1002/mma.5627

Numerical solution of multiterm variable-order fractional differential equations via shifted Legendre polynomials

Adel A. El-Sayed
, Praveen Agarwal

Al-Fayoum University
Ministry of Higher Education, Oman
International Center for Basic and Applied Sciences
International College of Engineering
Harish Chandra Research Institute

Research output: Contribution to journal › Article › peer-review

116 Scopus citations

Abstract

In this paper, shifted Legendre polynomials will be used for constructing the numerical solution for a class of multiterm variable-order fractional differential equations. In the proposed method, the shifted Legendre operational matrix of the fractional variable-order derivatives will be investigated. The fundamental problem is reduced to an algebraic system of equations using the constructed matrix and the collocation technique, which can be solved numerically. The error estimate of the proposed method is investigated. Some numerical examples are presented to prove the applicability, generality, and accuracy of the suggested method.

Original language	English
Pages (from-to)	3978-3991
Number of pages	14
Journal	Mathematical Methods in the Applied Sciences
Volume	42
Issue number	11
DOIs	https://doi.org/10.1002/mma.5627
State	Published - 30 Jul 2019
Externally published	Yes

Keywords

Caputo fractional derivative
Legendre polynomials
collocation spectral method
multiterm fractional differential equations
operational matrix

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10.1002/mma.5627

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abstract = "In this paper, shifted Legendre polynomials will be used for constructing the numerical solution for a class of multiterm variable-order fractional differential equations. In the proposed method, the shifted Legendre operational matrix of the fractional variable-order derivatives will be investigated. The fundamental problem is reduced to an algebraic system of equations using the constructed matrix and the collocation technique, which can be solved numerically. The error estimate of the proposed method is investigated. Some numerical examples are presented to prove the applicability, generality, and accuracy of the suggested method.",

keywords = "Caputo fractional derivative, Legendre polynomials, collocation spectral method, multiterm fractional differential equations, operational matrix",

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AU - Agarwal, Praveen

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N2 - In this paper, shifted Legendre polynomials will be used for constructing the numerical solution for a class of multiterm variable-order fractional differential equations. In the proposed method, the shifted Legendre operational matrix of the fractional variable-order derivatives will be investigated. The fundamental problem is reduced to an algebraic system of equations using the constructed matrix and the collocation technique, which can be solved numerically. The error estimate of the proposed method is investigated. Some numerical examples are presented to prove the applicability, generality, and accuracy of the suggested method.

AB - In this paper, shifted Legendre polynomials will be used for constructing the numerical solution for a class of multiterm variable-order fractional differential equations. In the proposed method, the shifted Legendre operational matrix of the fractional variable-order derivatives will be investigated. The fundamental problem is reduced to an algebraic system of equations using the constructed matrix and the collocation technique, which can be solved numerically. The error estimate of the proposed method is investigated. Some numerical examples are presented to prove the applicability, generality, and accuracy of the suggested method.

KW - Caputo fractional derivative

KW - Legendre polynomials

KW - collocation spectral method

KW - multiterm fractional differential equations

KW - operational matrix

UR - https://www.scopus.com/pages/publications/85064679062

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JO - Mathematical Methods in the Applied Sciences

JF - Mathematical Methods in the Applied Sciences

IS - 11

ER -

Numerical solution of multiterm variable-order fractional differential equations via shifted Legendre polynomials

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Keywords

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