Jingting Hu scite author profile

This paper is concerned with the fixed-time stability of delayed neural networks with impulsive perturbations. By means of inequality analysis technique and Lyapunov function method, some novel fixed-time stability criteria for the addressed neural networks are derived in terms of linear matrix inequalities (LMIs). The settling time can be estimated without depending on any initial conditions but only on the designed controllers. In addition, two different controllers are designed for the impulsive delayed neural networks. Moreover, each controller involves three parts, in which each part has different role in the stabilization of the addressed neural networks. Finally, two numerical examples are provided to illustrate the effectiveness of the theoretical analysis.

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Finite-Time Stability of Uncertain Nonlinear Systems with Time-Varying Delay

Sui²,

et al. 2017

Mathematical Problems in Engineering

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The problem of finite-time stability for a class of uncertain nonlinear systems with time-varying delay and external disturbances is investigated. By using the Lyapunov stability theory, sufficient conditions for the existence of finite-time state feedback controller for this class of systems are derived. The results can be applied to finite-time stability problems of linear time-delay systems with parameter uncertainties and external disturbances. Finally, two numerical examples are given to demonstrate the effectiveness of the obtained theoretical results.

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Fixed-time synchronization of complex networks with time-varying delays

Sui²,

2020

Chaos, Solitons & Fractals

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Fixed-time control of static impulsive neural networks with infinite distributed delay and uncertainty

Sui²

2019

Communications in Nonlinear Science and Numerical Simulation

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Stability of impulsive differential systems with state-dependent impulses via the linear decomposition method

Hu¹,

Sui²,

Akça³

et al. 2017

J. Nonlinear Sci. Appl.

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In this paper, we discuss the stability problem of the impulsive differential systems with state-dependent impulses. By using the linear decomposition methods, some sufficient conditions ensuring stability of the impulsive differential systems with state-dependent impulses are obtained and the estimate of the solution of such nonlinear systems is also acquired. Our results improve and generalize some of the known results given in earlier references. An example is given to demonstrate our results.

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Jingting Hu

Fixed-time control of delayed neural networks with impulsive perturbations

Finite-Time Stability of Uncertain Nonlinear Systems with Time-Varying Delay

Fixed-time synchronization of complex networks with time-varying delays

Fixed-time control of static impulsive neural networks with infinite distributed delay and uncertainty

Stability of impulsive differential systems with state-dependent impulses via the linear decomposition method

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