Boundary Value Problem for a Coupled System of Nonlinear Fractional q-Difference Equations with Caputo Fractional Derivatives

Redhwan, Saleh S.; Han, Maoan; Almalahi, Mohammed A.; Alsulami, Mona; Alyami, Maryam Ahmed

doi:10.3390/fractalfract8010073

Fractal Fract

2024

DOI: 10.3390/fractalfract8010073

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Boundary Value Problem for a Coupled System of Nonlinear Fractional q-Difference Equations with Caputo Fractional Derivatives

Saleh S. Redhwan,

Maoan Han,

Mohammed A. Almalahi

et al.

Abstract: This paper focuses on the analysis of a coupled system governed by a Caputo-fractional derivative with q-integral-coupled boundary conditions. This system is particularly relevant in modeling multi-atomic systems, including scenarios involving adsorbed atoms or clusters on crystalline surfaces, surface–atom scattering, and atomic friction. To investigate this system, we introduce an operator that exhibits fixed points corresponding to the solutions of the problem, effectively transforming the system into an eq… Show more

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2024

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Cited by 3 publications

References 28 publications

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Stability and Uniqueness Results for the Nonseparated Boundary Conditions of Nonlinear Coupled System of Fractional Differential Equations

Al-khateeb,

Zureigat,

Batiha

et al. 2024

International Journal of Mathematics and Mathematical Sciences

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In this article, the focus is on investigating the uniqueness, existence, and stability of a coupled system of fractional differential equations with non‐separated coupled boundary conditions. The uniqueness of solutions for the presented problem is discussed by employing the fixed‐point theorem. The Leray–Schauder’s alternative is used to investigate the existence of solutions for the presented equation. A formulation of certain conditions for the Hyers–Ulam type stability of solutions pertaining to the boundary value problem (BVP) is discussed. Finally, two numerical examples are presented to examine and illustrate our results.

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Stability and Uniqueness Results for the Nonseparated Boundary Conditions of Nonlinear Coupled System of Fractional Differential Equations

Al-khateeb,

Zureigat,

Batiha

et al. 2024

International Journal of Mathematics and Mathematical Sciences

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Analysis on existence of system of coupled multifractional nonlinear hybrid differential equations with coupled boundary conditions

Latha Maheswari,

Keerthana Shri,

Sajid

2024

MATH

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<abstract><p>This article dealt with a class of coupled hybrid fractional differential system. It consisted of a mixed type of Caputo and Hilfer fractional derivatives with respect to two different kernel functions, $ \psi_{_1} $ and $ \psi_{_2} $, respectively, in addition to coupled boundary conditions. The existence of the solution of the system was investigated using the Dhage fixed point theorem. Finally, an illustration was presented to validate our findings.</p></abstract>

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Piecewise implicit coupled system under ABC fractional differential equations with variable order

Redhwan,

Han,

Almalahi

et al. 2024

MATH

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<abstract><p>This research paper presented a novel investigation into an implicit coupled system of fractional variable order, which has not been previously studied in the existing literature. The study focused on establishing and developing sufficient conditions for the existence and uniqueness of solutions, as well as the Ulam-Hyers stability, for the proposed coupled system without using semigroup property. By extending the existing conclusions examined for the Atangana-Baleanu-Caputo (ABC) operator, we contributed to advancing the understanding of variable-order fractional differential equations. The paper provided a solid theoretical foundation for further analysis, numerical simulations, and practical applications. The obtained results have implications for designing and controlling systems modeled using fractional variable order equations and serve as a basis for addressing a wide range of dynamical problems. The transformation techniques, qualitative analysis, and illustrative examples presented in this work highlight its unique contributions and potential to serve as a foundation for future research.</p></abstract>

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Boundary Value Problem for a Coupled System of Nonlinear Fractional q-Difference Equations with Caputo Fractional Derivatives

Cited by 3 publications

References 28 publications

Stability and Uniqueness Results for the Nonseparated Boundary Conditions of Nonlinear Coupled System of Fractional Differential Equations

Stability and Uniqueness Results for the Nonseparated Boundary Conditions of Nonlinear Coupled System of Fractional Differential Equations

Analysis on existence of system of coupled multifractional nonlinear hybrid differential equations with coupled boundary conditions

Piecewise implicit coupled system under ABC fractional differential equations with variable order

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