Numerical Solution of Conformable Fractional Periodic Boundary Value Problems by Shifted Jacobi Method

Abeer Al-Nana; Iqbal M. Batiha; Iqbal H. Jebril; Shawkat Al Khazaleh; Thabet Abdeljawad

doi:10.33889/IJMEMS.2025.10.1.011

Numerical Solution of Conformable Fractional Periodic Boundary Value Problems by Shifted Jacobi Method

Abeer Al-Nana, Iqbal M. Batiha^*, Iqbal H. Jebril, Shawkat Al Khazaleh, Thabet Abdeljawad

^*Corresponding author for this work

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

2 Citations (Scopus)

Abstract

This paper presents the so-called shifted Jacobi method, an efficient numerical technique to solve second-order periodic boundary value problems with finitely many singularities involving nonlinear systems of two points. The method relies on the Jacobi polynomials used as natural basis functions in the conformable sense of fractional derivative. A study is carried out to compare the outcomes of the shifted Jacobi approach with those of other methods that are currently in use. In the same vein, a theoretical result for establishing a bound of the error generated from the proposed approximate solution is proved accordingly. The efficiency and effectiveness of the shifted Jacobi technique with conformable fractional derivative are discussed numerically.

Original language	English
Pages (from-to)	189-206
Number of pages	18
Journal	International Journal of Mathematical, Engineering and Management Sciences
Volume	10
Issue number	1
DOIs	https://doi.org/10.33889/IJMEMS.2025.10.1.011
Publication status	Published - Feb 2025
Externally published	Yes

Keywords

Conformable fractional derivative
Jacobi orthogonal polynomials
Nonlinear boundary value problems
Nonlinear fractional differential equations

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10.33889/IJMEMS.2025.10.1.011

Cite this

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title = "Numerical Solution of Conformable Fractional Periodic Boundary Value Problems by Shifted Jacobi Method",

abstract = "This paper presents the so-called shifted Jacobi method, an efficient numerical technique to solve second-order periodic boundary value problems with finitely many singularities involving nonlinear systems of two points. The method relies on the Jacobi polynomials used as natural basis functions in the conformable sense of fractional derivative. A study is carried out to compare the outcomes of the shifted Jacobi approach with those of other methods that are currently in use. In the same vein, a theoretical result for establishing a bound of the error generated from the proposed approximate solution is proved accordingly. The efficiency and effectiveness of the shifted Jacobi technique with conformable fractional derivative are discussed numerically.",

keywords = "Conformable fractional derivative, Jacobi orthogonal polynomials, Nonlinear boundary value problems, Nonlinear fractional differential equations",

author = "Abeer Al-Nana and Batiha, {Iqbal M.} and Jebril, {Iqbal H.} and {Al Khazaleh}, Shawkat and Thabet Abdeljawad",

note = "Publisher Copyright: copyright {\textcopyright} Ram Arti Publishers.",

year = "2025",

month = feb,

doi = "10.33889/IJMEMS.2025.10.1.011",

language = "English",

volume = "10",

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T1 - Numerical Solution of Conformable Fractional Periodic Boundary Value Problems by Shifted Jacobi Method

AU - Al-Nana, Abeer

AU - Batiha, Iqbal M.

AU - Jebril, Iqbal H.

AU - Al Khazaleh, Shawkat

AU - Abdeljawad, Thabet

PY - 2025/2

Y1 - 2025/2

N2 - This paper presents the so-called shifted Jacobi method, an efficient numerical technique to solve second-order periodic boundary value problems with finitely many singularities involving nonlinear systems of two points. The method relies on the Jacobi polynomials used as natural basis functions in the conformable sense of fractional derivative. A study is carried out to compare the outcomes of the shifted Jacobi approach with those of other methods that are currently in use. In the same vein, a theoretical result for establishing a bound of the error generated from the proposed approximate solution is proved accordingly. The efficiency and effectiveness of the shifted Jacobi technique with conformable fractional derivative are discussed numerically.

AB - This paper presents the so-called shifted Jacobi method, an efficient numerical technique to solve second-order periodic boundary value problems with finitely many singularities involving nonlinear systems of two points. The method relies on the Jacobi polynomials used as natural basis functions in the conformable sense of fractional derivative. A study is carried out to compare the outcomes of the shifted Jacobi approach with those of other methods that are currently in use. In the same vein, a theoretical result for establishing a bound of the error generated from the proposed approximate solution is proved accordingly. The efficiency and effectiveness of the shifted Jacobi technique with conformable fractional derivative are discussed numerically.

KW - Conformable fractional derivative

KW - Jacobi orthogonal polynomials

KW - Nonlinear boundary value problems

KW - Nonlinear fractional differential equations

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DO - 10.33889/IJMEMS.2025.10.1.011

M3 - Article

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VL - 10

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JO - International Journal of Mathematical, Engineering and Management Sciences

JF - International Journal of Mathematical, Engineering and Management Sciences

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Numerical Solution of Conformable Fractional Periodic Boundary Value Problems by Shifted Jacobi Method

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