Analytical Investigation of Positive Continuous Solutions for Nonlinear Quadratic Integral Equations of Hammerstein Type via Fixed-Point Methodological Approaches

Mohamed Khalil Mohamed; Eisha Mohamed Ali Saleem

doi:10.64943/ljmas.v3i4.190

Analytical Investigation of Positive Continuous Solutions for Nonlinear Quadratic Integral Equations of Hammerstein Type via Fixed-Point Methodological Approaches

Authors

Mohamed Khalil Mohamed Mathematics Department, Faculty of Arts &Sciences, University of Benghazi, AL-Wahat, Libya
Eisha Mohamed Ali Saleem Department of Mathematics, Faculty of Science, Misurata University, Misurata, Libya

DOI:

https://doi.org/10.64943/ljmas.v3i4.190

Keywords:

Nonlinear Quadratic Integral Equations, Hammerstein-Type Operators, Carathéodory-Class Functions, Monotonic Operators, Extremal Solutions, Lebesgue Integration Theory, Schauder Fixed-Point Methodology

Abstract

This study establishes rigorous existence criteria for positive continuous solutions to a significant class of nonlinear quadratic integral equations of Hammerstein type. The investigation employs Schauder's fixed-point theorem as the principal analytical tool to derive the main existence result. Furthermore, under appropriately formulated monotonicity constraints, the existence of both maximal and minimal solutions is demonstrated. These theoretical contributions extend the existing mathematical literature on quadratic integral equations by introducing novel methodological frameworks and broadening the domain of applicability for this important category of nonlinear functional equations.

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Published

2025-10-10

How to Cite

Mohamed Khalil Mohamed, & Eisha Mohamed Ali Saleem. (2025). Analytical Investigation of Positive Continuous Solutions for Nonlinear Quadratic Integral Equations of Hammerstein Type via Fixed-Point Methodological Approaches. Libyan Journal of Medical and Applied Sciences, 3(4), 48–54. https://doi.org/10.64943/ljmas.v3i4.190