New technique for solving the numerical computation of neutral fractional functional integro-differential equation based on the Legendre wavelet method

Kanagaraj Muthuselvan; Baskar Sundaravadivoo; Kottakkaran Sooppy Nisar; Fahad Sameer Alshammari

doi:10.3934/math.2024694

New technique for solving the numerical computation of neutral fractional functional integro-differential equation based on the Legendre wavelet method

Kanagaraj Muthuselvan, Baskar Sundaravadivoo, Kottakkaran Sooppy Nisar, Fahad Sameer Alshammari

Mathematics

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

2 Scopus citations

Abstract

The aim of this work is to solve a numerical computation of the neutral fractional functional integro-differential equation based on a new approach to the Legendre wavelet method. The concept of fractional derivatives was examined in the sense of Caputo. The properties of the Legendre wavelet and function approximation were employed to determine the approximate solution of a given dynamical system. Moreover, the error estimations and convergence analysis of the truncated Legendre wavelet expansion for the proposed problem were discussed. The validity and applicability of this proposed technique to numerical computation were shown by illustrative examples. Eventually, the results of this technique demonstrate its great effectiveness and reliability.

Original language	English
Pages (from-to)	14288-14309
Number of pages	22
Journal	AIMS Mathematics
Volume	9
Issue number	6
DOIs	https://doi.org/10.3934/math.2024694
State	Published - 2024

Keywords

error analysis
fractional derivatives
Legendre wavelet
numerical computation

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10.3934/math.2024694

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title = "New technique for solving the numerical computation of neutral fractional functional integro-differential equation based on the Legendre wavelet method",

abstract = "The aim of this work is to solve a numerical computation of the neutral fractional functional integro-differential equation based on a new approach to the Legendre wavelet method. The concept of fractional derivatives was examined in the sense of Caputo. The properties of the Legendre wavelet and function approximation were employed to determine the approximate solution of a given dynamical system. Moreover, the error estimations and convergence analysis of the truncated Legendre wavelet expansion for the proposed problem were discussed. The validity and applicability of this proposed technique to numerical computation were shown by illustrative examples. Eventually, the results of this technique demonstrate its great effectiveness and reliability.",

keywords = "error analysis, fractional derivatives, Legendre wavelet, numerical computation",

author = "Kanagaraj Muthuselvan and Baskar Sundaravadivoo and Nisar, \{Kottakkaran Sooppy\} and Alshammari, \{Fahad Sameer\}",

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AU - Muthuselvan, Kanagaraj

AU - Sundaravadivoo, Baskar

AU - Nisar, Kottakkaran Sooppy

AU - Alshammari, Fahad Sameer

PY - 2024

Y1 - 2024

N2 - The aim of this work is to solve a numerical computation of the neutral fractional functional integro-differential equation based on a new approach to the Legendre wavelet method. The concept of fractional derivatives was examined in the sense of Caputo. The properties of the Legendre wavelet and function approximation were employed to determine the approximate solution of a given dynamical system. Moreover, the error estimations and convergence analysis of the truncated Legendre wavelet expansion for the proposed problem were discussed. The validity and applicability of this proposed technique to numerical computation were shown by illustrative examples. Eventually, the results of this technique demonstrate its great effectiveness and reliability.

AB - The aim of this work is to solve a numerical computation of the neutral fractional functional integro-differential equation based on a new approach to the Legendre wavelet method. The concept of fractional derivatives was examined in the sense of Caputo. The properties of the Legendre wavelet and function approximation were employed to determine the approximate solution of a given dynamical system. Moreover, the error estimations and convergence analysis of the truncated Legendre wavelet expansion for the proposed problem were discussed. The validity and applicability of this proposed technique to numerical computation were shown by illustrative examples. Eventually, the results of this technique demonstrate its great effectiveness and reliability.

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KW - fractional derivatives

KW - Legendre wavelet

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JO - AIMS Mathematics

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ER -

New technique for solving the numerical computation of neutral fractional functional integro-differential equation based on the Legendre wavelet method

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Keywords

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