An Approach to Generalized High-Order Fredholm Integro-Differential Equations via Fractional Cubic Spline

Rahel J. Qadir; Faraidun K. Hamasalh; Shabaz J. Mohammedfaeq; Hiwa H.  Rahman

doi:10.29196/jubpas.v34i1.6420

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Published: 31-03-2026

DOI: https://doi.org/10.29196/jubpas.v34i1.6420

Keywords:

fractional calculus, integro-differential equations, fractional spline function, collocation method, convergence analysis

Rahel J. Qadir

Department of Mathematical Science, College of Basic Education, University of Sulaimani, Sulaymaniyah 46001, Iraq

Faraidun K. Hamasalh

Sulaimani Polytechnic University, Bakrajo Technical Institute, Sulaimani, Iraq.

Shabaz J. Mohammedfaeq

Department of Mathematics, College of Science, University of Sulaimani, Sulaymaniyah 46001, Iraq

Hiwa H. Rahman

Department of Mathematics, College of Science, University of Sulaimani, Sulaymaniyah 46001, Iraq

Abstract

This paper presents an efficient numerical technique for the approximate solution of multi-term integro-differential equations using a new form of fractional cubic spline (FCS). The proposed method is derived from a fractional boundary condition and a fractional continuity condition on a fractional spline, expressed in matrix form. A detailed convergence analysis is provided, and sufficient conditions for stability and error bounds of the method are established. Moreover, several numerical examples are solved, and the results are compared with exact solutions and methods from previous papers, presented in tables and figures. These comparisons demonstrate the efficacy and suitability of the suggested fractional spline scheme for solving integro-differential problems, achieving higher accuracy with fewer grid points. All computational results were obtained using Python 3.12.4.

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Vol. 34 No. 1 (2026): Vol.34 Issue 1( 2026)

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This work is licensed under a Creative Commons Attribution 4.0 International License.

How to Cite

[1]

“An Approach to Generalized High-Order Fredholm Integro-Differential Equations via Fractional Cubic Spline”, JUBPAS, vol. 34, no. 1, pp. 353–367, Mar. 2026, doi: 10.29196/jubpas.v34i1.6420.

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