NUMERICAL SOLUTIONS FOR LINEAR INTEGRO-DIFFERENTIAL EQUATIONS USING SHIFTED LEGENDRE BASIS FUNCTIONS.

Olutola Olayemi Babalola; Ajimot Folasade ADEBISI

doi:10.35508/jd.v7i1.18137

NUMERICAL SOLUTIONS FOR LINEAR INTEGRO-DIFFERENTIAL EQUATIONS USING SHIFTED LEGENDRE BASIS FUNCTIONS.

Olutola Olayemi Babalola^(1*)
Osun State College of Science and Technology, esa-Oke
Ajimot Folasade ADEBISI⁽²⁾
Department of Mathematical Sciences, Osun State University

DOI: https://doi.org/10.35508/jd.v7i1.18137

Keywords: Shifted Legendre Basis functions, Integro-differential Equations, Numerical Solution, Approximate Method, Computational Efficiency

Abstract

This research explore the use of Shifted Legendre Basis functions for the numerical solution of a specific class of integro-differential equations. These equations are known for their analytical complexity,
making it challenging to derive exact solutions. To address this, we employ an approximate method
using Legendre polynomials as basis functions, which provides an efficient approach to finding solutions for these complex problems. The proposed method is computationally efficient, requiring
minimal computational resources and storage. The results obtained demonstrate strong agreement
with existing solutions found in the literature, validating the accuracy and effectiveness of the approach. This study highlights the potential of Shifted Legendre Basis functions in solving challenging integro-differential equations, offering a reliable alternative to more computationally intensive
methods.

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Published

2025-04-15

How to Cite

Babalola O, ADEBISI A. NUMERICAL SOLUTIONS FOR LINEAR INTEGRO-DIFFERENTIAL EQUATIONS USING SHIFTED LEGENDRE BASIS FUNCTIONS. JD [Internet]. 15Apr.2025 [cited 19Apr.2025];7(1):55-2. Available from: https://ejurnal.undana.ac.id/index.php/JD/article/view/18137