On the Solutions of Nonlinear Implicit ω-Caputo Fractional Order Ordinary Differential Equations with Two-Point Fractional Derivatives and Integral Boundary Conditions in Banach Algebra

Authors

  • Yousuf Alkhezi Mathematics Department, College of Basic Education, Public Authority for Applied Education and Training (PAAET), P.O. Box 34053, Kuwait City 70654, Kuwait https://orcid.org/0000-0002-9210-2674
  • Yahia Awad Department of Mathematics and Physics, Lebanese International University (LIU), Bekaa Campus, Al-Khyara P.O. Box 5, West Bekaa, Lebanon https://orcid.org/0000-0001-9878-2482
  • Karim Amin Department of Mathematics and Physics, Lebanese International University (LIU), Bekaa Campus, Al-Khyara P.O. Box 5, West Bekaa, Lebanon https://orcid.org/0009-0001-3422-8244
  • Ragheb Mghames Department of Mathematics and Physics, Lebanese International University (LIU), Bekaa Campus, Al-Khyara P.O. Box 5, West Bekaa, Lebanon https://orcid.org/0000-0001-9459-8530

DOI:

https://doi.org/10.37256/cm.5420245216

Keywords:

nonlinear fractional differential equations, ω-Caputo fractional derivatives, two-point fractional derivatives, integral boundary conditions, Banach algebra, existence and uniqueness, stability analysis, Ulam-Hyers and Ulam-Hyers-Rassias sense

Abstract

This article delves into the analysis of nonlinear implicit ω-Caputo fractional-order ordinary differential equations (NLIFDEs) with two-point fractional derivatives and integral boundary conditions within the context of Banach algebra. The primary focus is on demonstrating the existence and uniqueness of solutions for these complex fractional differential equations by utilizing Banach's and Krasnoselskii's fixed point theorems. Furthermore, the study explores the stability of these solutions through the Ulam-Hyers and Ulam-Hyers-Rassias stability criteria, thereby assessing the robustness of the proposed model. To illustrate the versatility of the generalized model, several special cases are examined, showcasing its ability to encompass various classical models. The practical applicability of the theoretical findings is underscored through a numerical example, which demonstrates the feasibility and relevance of the proposed methodology. This thorough investigation advances the comprehension of nonlinear fractional differential equations with integral boundary conditions, highlighting the intricate relationship between fractional derivatives, nonlinearities, and integral terms. The results offer significant insights into the behavior and stability of solutions within this demanding mathematical framework.

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Published

2024-11-06

How to Cite

1.
Alkhezi Y, Awad Y, Amin K, Mghames R. On the Solutions of Nonlinear Implicit ω-Caputo Fractional Order Ordinary Differential Equations with Two-Point Fractional Derivatives and Integral Boundary Conditions in Banach Algebra. Contemp. Math. [Internet]. 2024 Nov. 6 [cited 2024 Dec. 21];5(4):4805-3. Available from: https://ojs.wiserpub.com/index.php/CM/article/view/5216