Finite-time synchronization criterion of graph theory perspective fractional-order coupled discontinuous neural networks

Anbalagan, Pratap; Raja, R.; Cao, Jinde; Alzabut, Jehad; Huang, Chuangxia

doi:10.1186/s13662-020-02551-x

Cited by 34 publications

(14 citation statements)

References 67 publications

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“…If the error system e(t) = h(t) − z(t) converges to 0, that is Proof. According to the error system (28), the proof of Theorems 4 is similar to that of Theorems 2. Hence, the proof is omitted.…”

Section: Synchronization Analysis Of Fcqvnnsmentioning

confidence: 94%

Some Dynamical Behaviors of Fractional-Order Commutative Quaternion-Valued Neural Networks via Direct Method of Lyapunov

et al. 2021

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Some dynamical behaviors of fractional-order commutative quaternion-valued neural networks (FCQVNNs) are studied in this paper. First, because the commutative quaternion does not satisfy Schwartz triangle inequality, the FCQVNNs are divided into four real-valued neural networks (RVNNs) through quaternion commutative multiplication rules. Furthermore, several types of dynamical behaviors including global Mittag-Leffler stability, the boundedness with bounded disturbances, complete synchronization and quasi-synchronization of FCQVNNs are studied. Simultaneously, several conditions for these dynamical behaviors are driven by fractional-order Lyapunov direct method, some inequality techniques and fractional differential equation theory. At last, the effectiveness and feasibility of the obtained theoretical results are verified by several numerical simulation examples.

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Section: Synchronization Analysis Of Fcqvnnsmentioning

confidence: 94%

Some Dynamical Behaviors of Fractional-Order Commutative Quaternion-Valued Neural Networks via Direct Method of Lyapunov

et al. 2021

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“…It is mainly used in the fields of economy and insurance, the analysis of the quantitative structure of biological population, the control of diseases, and the research of genetic law, and we can see these monographs in [1][2][3][4][5]. For more notable achievements of this concept, the readers can also refer to [6][7][8][9][10][11][12][13][14][15].…”

Section: Introductionmentioning

confidence: 99%

Ulam–Hyers Stability of Caputo-Type Fractional Stochastic Differential Equations with Time Delays

Wang

Luo

et al. 2021

Mathematical Problems in Engineering

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In this paper, we study a class of Caputo-type fractional stochastic differential equations (FSDEs) with time delays. Under some new criteria, we get the existence and uniqueness of solutions to FSDEs by Carath e ´ odory approximation. Furthermore, with the help of H o ¨ lder’s inequality, Jensen’s inequality, It o ^ isometry, and Gronwall’s inequality, the Ulam–Hyers stability of the considered system is investigated by using Lipschitz condition and non-Lipschitz condition, respectively. As an application, we give two representative examples to show the validity of our theories.

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“…Fractional calculus in continuous and discrete operators has also been comprehensively utilized in numerous fields [11][12][13][14][15][16][17][18][19][20][21][22][23][24][25][26][27][28][29][30]. But the concept has been propagated and implemented in applied mathematics, physics and porous media as a mathematical model.…”

Section: Introductionmentioning

confidence: 99%

New estimates considering the generalized proportional Hadamard fractional integral operators

et al. 2020

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In the article, we describe the Grüss type inequality, provide some related inequalities by use of suitable fractional integral operators, address several variants by utilizing the generalized proportional Hadamard fractional (GPHF) integral operator. It is pointed out that our introduced new integral operators with nonlocal kernel have diversified applications. Our obtained results show the computed outcomes for an exceptional choice to the GPHF integral operator with parameter and the proportionality index. Additionally, we illustrate two examples that can numerically approximate these operators.

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Finite-time synchronization criterion of graph theory perspective fractional-order coupled discontinuous neural networks

Cited by 34 publications

References 67 publications

Some Dynamical Behaviors of Fractional-Order Commutative Quaternion-Valued Neural Networks via Direct Method of Lyapunov

Some Dynamical Behaviors of Fractional-Order Commutative Quaternion-Valued Neural Networks via Direct Method of Lyapunov

Ulam–Hyers Stability of Caputo-Type Fractional Stochastic Differential Equations with Time Delays

New estimates considering the generalized proportional Hadamard fractional integral operators

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