A novel fractional structure of a multi-order quantum multi-integro-differential problem

Phương, Nguyễn Duy; Sakar, F. Müge; Etemad, Sina; Rezapour, Shahram

doi:10.1186/s13662-020-03092-z

Cited by 23 publications

(6 citation statements)

References 53 publications

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“…δ, ϵ, T { }. By using Matlab (the pseudocode to compute different values of Γ q (α), see [35]), when t � 0.6 ∈ [a, 1] q , 1 + A 1 � � � � � � � � + L 1 Γ q (α + 1) (t − a) α q 􏼠 􏼡 q E α+β (c, t − a)…”

Section: Examplementioning

confidence: 99%

Finite-Time Stability of Solutions for Nonlinear $q$ -Fractional Difference Coupled Delay Systems

Wang

Bai

2021

Discrete Dynamics in Nature and Society

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In this paper, we investigate and prove a new discrete q -fractional version of the coupled Gronwall inequality. By applying this result, the finite-time stability criteria of solutions for a class of nonlinear q -fractional difference coupled delay systems are obtained. As an application, an example is provided to demonstrate the effectiveness of our result.

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Section: Examplementioning

confidence: 99%

Finite-Time Stability of Solutions for Nonlinear $q$ -Fractional Difference Coupled Delay Systems

Wang

Bai

2021

Discrete Dynamics in Nature and Society

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“…In 2020, Phuong et al [23] formulated a novel extended configuration of the Caputo q-multi-integro-difference equation with two nonlinearity under q-multi-order-integrals conditions…”

Section: Introductionmentioning

confidence: 99%

An Existence Study on the Fractional Coupled Nonlinear $q$ -Difference Systems via Quantum Operators along with Ulam–Hyers and Ulam–Hyers–Rassias Stability

Rezapour

Thaiprayoon

Etemad

et al. 2022

Journal of Function Spaces

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In this paper, we study the existence of solutions and their uniqueness and different kinds of Ulam–Hyers stability for a new class of nonlinear Caputo quantum boundary value problems. Also, we investigate such properties for the relevant generalized coupled q -system involving fractional quantum operators. By using the Banach contraction principle and Leray-Schauder’s fixed–point theorem, we prove the existence and uniqueness of solutions for the suggested fractional quantum problems. The Ulam–Hyers stability of solutions in different forms are studied. Finally, some examples are provided for both q -problem and coupled q -system to show the validity of the main results.

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“…Over the past few decades, fractional-order systems have been considered for the modeling of realistic phenomena due to their possession of memory effects [8][9][10][11][12]. This feature makes the fractional-order models more practical to describe real-world processes compared to the classic integer-order models with ordinary time derivatives [13][14][15][16][17][18]. Besides, it was demonstrated that the fractional models are capable of describing chaotic systems properly, so these models have appeared in different fields dealing with chaos like mechanics, biology, and finance [19][20][21].…”

Section: Introductionmentioning

confidence: 99%

A nonstandard finite difference scheme for the modeling and nonidentical synchronization of a novel fractional chaotic system

et al. 2021

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The aim of this paper is to introduce and analyze a novel fractional chaotic system including quadratic and cubic nonlinearities. We take into account the Caputo derivative for the fractional model and study the stability of the equilibrium points by the fractional Routh–Hurwitz criteria. We also utilize an efficient nonstandard finite difference (NSFD) scheme to implement the new model and investigate its chaotic behavior in both time-domain and phase-plane. According to the obtained results, we find that the new model portrays both chaotic and nonchaotic behaviors for different values of the fractional order, so that the lowest order in which the system remains chaotic is found via the numerical simulations. Afterward, a nonidentical synchronization is applied between the presented model and the fractional Volta equations using an active control technique. The numerical simulations of the master, the slave, and the error dynamics using the NSFD scheme are plotted showing that the synchronization is achieved properly, an outcome which confirms the effectiveness of the proposed active control strategy.

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A novel fractional structure of a multi-order quantum multi-integro-differential problem

Cited by 23 publications

References 53 publications

Finite-Time Stability of Solutions for Nonlinear $q$ -Fractional Difference Coupled Delay Systems

Finite-Time Stability of Solutions for Nonlinear $q$ -Fractional Difference Coupled Delay Systems

An Existence Study on the Fractional Coupled Nonlinear $q$ -Difference Systems via Quantum Operators along with Ulam–Hyers and Ulam–Hyers–Rassias Stability

A nonstandard finite difference scheme for the modeling and nonidentical synchronization of a novel fractional chaotic system

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A novel fractional structure of a multi-order quantum multi-integro-differential problem

Cited by 23 publications

References 53 publications

Finite-Time Stability of Solutions for Nonlinear q -Fractional Difference Coupled Delay Systems

Finite-Time Stability of Solutions for Nonlinear q -Fractional Difference Coupled Delay Systems

An Existence Study on the Fractional Coupled Nonlinear q -Difference Systems via Quantum Operators along with Ulam–Hyers and Ulam–Hyers–Rassias Stability

A nonstandard finite difference scheme for the modeling and nonidentical synchronization of a novel fractional chaotic system

Contact Info

Product

Resources

About

Finite-Time Stability of Solutions for Nonlinear $q$ -Fractional Difference Coupled Delay Systems

Finite-Time Stability of Solutions for Nonlinear $q$ -Fractional Difference Coupled Delay Systems

An Existence Study on the Fractional Coupled Nonlinear $q$ -Difference Systems via Quantum Operators along with Ulam–Hyers and Ulam–Hyers–Rassias Stability