Existence and Globally Asymptotic Stability of Equilibrium Solution for Fractional-Order Hybrid BAM Neural Networks with Distributed Delays and Impulses

Zhang, Hai; Ye, Renyu; Cao, Jinde; Alsaedi, Ahmed

doi:10.1155/2017/6875874

Cited by 15 publications

(10 citation statements)

References 46 publications

(104 reference statements)

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“…equaling to values of the state variable after the jump and before the jump, respectively, or similar one. In the case of the RL fractional derivative, some authors use this type of impulsive conditions (see, for example, [28]). But because of the type of the initial condition, we think that the above given type of the impulsive condition is not appropriate.…”

Section: Rl Fractional Model With Fixed Points Of Impulsesmentioning

confidence: 99%

“…In the case when the time of impulsive perturbations are initially given deterministic points, the impulsive models with ordinary derivatives for neural networks are studied in [9,19,22,25,26,33]. Note that impulsive fractional neural networks are studied for Caputo fractional derivative in several papers, such as [17,20,24,32], and for RL fractional derivative, see [28,29].…”

Section: Introductionmentioning

confidence: 99%

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Mean-square stability of Riemann–Liouville fractional Hopfield’s graded response neural networks with random impulses

et al. 2021

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In this paper a model of Hopfield’s graded response neural network is investigated. A network whose neurons are subject to a certain impulsive state displacement at random times is considered. The model is set up and studied. The presence of random moments of impulses in the model leads to a change of the solutions to stochastic processes. Also, we use the Riemann–Liouville fractional derivative to model adequately the long-term memory and the nonlocality in the neural networks. We set up in an appropriate way both the initial conditions and the impulsive conditions at random moments. The application of the Riemann–Liouville fractional derivative leads to a new definition of the equilibrium point. We define mean-square Mittag-Leffler stability in time of the equilibrium point of the model and study this type of stability. Some sufficient conditions for this type of stability are obtained. The general case with time varying self-regulating parameters of all units and time varying functions of the connection between two neurons is studied.

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Section: Rl Fractional Model With Fixed Points Of Impulsesmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Mean-square stability of Riemann–Liouville fractional Hopfield’s graded response neural networks with random impulses

et al. 2021

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“…Otherwise, during a particular period, the signal propagation is distributed because the variety of axon sizes and lengths are too large. In this manner, the attention of distributed delays is significant in fractional order neural networks (FONNs) dynamical systems, and there is a huge amount of research works on FONNs with distributed delay-see, for instance, [35,36]. In [20], the existence and Lyapunov-stability of impulsive hybrid FOBNNs with mixed delays were discussed by Zhang et al and the sufficient conditions are derived to assure the stability condition of Hybrid FOBNNs with mixed time-delays via contraction mapping principle, integer order Lyapunov functional and periodically intermittent control.…”

Section: Introductionmentioning

confidence: 99%

Hybrid Control Scheme for Projective Lag Synchronization of Riemann–Liouville Sense Fractional Order Memristive BAM NeuralNetworks with Mixed Delays

et al. 2019

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This sequel is concerned with the analysis of projective lag synchronization of Riemann–Liouville sense fractional order memristive BAM neural networks (FOMBNNs) with mixed time delays via hybrid controller. Firstly, a new type of hybrid control scheme, which is the combination of open loop control and adaptive state feedback control is designed to guarantee the global projective lag synchronization of the addressed FOMBNNs model. Secondly, by using a Lyapunov–Krasovskii functional and Barbalet’s lemma, a new brand of sufficient criterion is proposed to ensure the projective lag synchronization of the FOMBNNs model considered. Moreover, as special cases by using a hybrid control scheme, some sufficient conditions are derived to ensure the global projective synchronization, global complete synchronization and global anti-synchronization for the FOMBNNs model considered. Finally, numerical simulations are provided to check the accuracy and validity of our obtained synchronization results.

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“…In recent years, many great contributions have been made to the dynamics of systems [11][12][13][14][15][16][17][18][19][20][21][22] which is closely related to the applications in various elds. For example, the references [11,[14][15][16][17][18][19][20] reported some research on the global asymptotic stability, Mittag-Le er stability, uniform stability, and nite-time stability. In [12,21,22], the authors investigated the adaptive synchronization, the nite-time synchronization, and the Mittag-Le er synchronization for several kinds of fractional-order BAM neural networks.…”

Section: Introductionmentioning

confidence: 99%

Stability Analysis of Fractional‐Order Bidirectional Associative Memory Neural Networks with Mixed Time‐Varying Delays

Yang

Zhang

2019

Complexity

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This paper studies the stability analysis of fractional-order bidirectional associative memory neural networks with mixed time-varying delays. The orders of these systems lie in the interval 1,2. Firstly, a sufficient condition is derived to ensure the finite-time stability of systems by resorting to some analytical techniques and some elementary inequalities. Next, a sufficient condition is obtained to guarantee the global asymptotic stability of systems based on the Laplace transform, the mean value theorem, the generalized Gronwall inequality, and some properties of Mittag–Leffler functions. In particular, these obtained conditions are expressed as some algebraic inequalities which can be easily calculated in practical applications. Finally, some numerical examples are given to verify the feasibility and effectiveness of the obtained main results.

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Existence and Globally Asymptotic Stability of Equilibrium Solution for Fractional-Order Hybrid BAM Neural Networks with Distributed Delays and Impulses

Cited by 15 publications

References 46 publications

Mean-square stability of Riemann–Liouville fractional Hopfield’s graded response neural networks with random impulses

Mean-square stability of Riemann–Liouville fractional Hopfield’s graded response neural networks with random impulses

Hybrid Control Scheme for Projective Lag Synchronization of Riemann–Liouville Sense Fractional Order Memristive BAM NeuralNetworks with Mixed Delays

Stability Analysis of Fractional‐Order Bidirectional Associative Memory Neural Networks with Mixed Time‐Varying Delays

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