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Publication Date
Fri Oct 31 2025
Journal Name
Mathematical Modelling Of Engineering Problems
Volume
12
DOI
10.18280/mmep.121008
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Modified Optimization Algorithms for Infinite Integro-Differential Equations via Generalized Laguerre Polynomials
convergence analysis
generalized Laguerre polynomial
infinite-boundary problems
integro-differential equation
optimization techniques
Farah J. Al-Zahid
Nadia M. J. Ibrahem
Suha Shihab
Nadia M. G. Al-Saidi
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This study emphasizes the infinite-boundary integro-differential equation. To examine the approximate solution of the problem, two modified optimization algorithms are proposed based on generalized Laguerre functions. In the first technique, the proposed method is applied to the original problem by approximating the solution using the truncated generalized Laguerre polynomial of the unknown function, optimizing coefficients through error minimization, and transforming the integro-differential equation into an algebraic equation. In contrast, the second approach incorporates a penalty term into the objective function to effectively enforce boundary and integral constraints. This technique reduces the original problem to a mathematical optimization problem, making it easier to manage. The proposed methods are examined through various experiments, including numerical applications such as thermal, pharmacokinetic, oscillatory, aerodynamic, and ecological models, to demonstrate the validity, efficiency, and applicability of the techniques. Error analysis indicates that the approximation becomes more accurate as the number of generalized Laguerre basis functions increases.

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The effect of using the educational bag on the level of learning some offensive skills with the epee weapon
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