Stabilization of a class of cascade nonlinear switched systems with application to chaotic systems

Aghababa, Mohammad Pourmahmood

doi:10.1002/rnc.4104

Cited by 9 publications

(6 citation statements)

References 34 publications

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“…is not only reduces the complexity of the controller but also reduces the difficulty of stability analysis [17][18][19][20]. A natural question is how to study the stability of switching nonlinear cascade robust H ∞ control systems through passivity, and in this paper, we will work to solve these problems.…”

Section: Introductionmentioning

confidence: 99%

Robust $H_{\infty}$ Control for the Nonlinear Cascade Systems with Passive and Nonpassive Subsystems

Zhao

Wang

2021

Mathematical Problems in Engineering

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In this paper, H ∞ control for the uncertain switched nonlinear cascade systems with passive and nonpassive subsystems is investigated. Based on the average dwell time method, for any given passivity rate, average dwell time, and disturbance attenuation level, the feedback controllers of the subsystems by predetermined constants are designed to solve the exponential stability and L 2 -gain problems of H ∞ control for switched nonlinear cascade systems. Two examples are provided to demonstrate the effectiveness of the proposed design method.

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Section: Introductionmentioning

confidence: 99%

Robust $H_{\infty}$ Control for the Nonlinear Cascade Systems with Passive and Nonpassive Subsystems

Zhao

Wang

2021

Mathematical Problems in Engineering

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“…Obviously, chaos will lead to the instability of the converter via increasing the oscillation and producing the excessive irregular electromagnetic noise, which directly affects the operation quality and reliability of the converter. In fact, the Buck-Boost is a switched model, and control of the nonlinear switched systems is a challenging topic [12]. As a result, there are also many other reports about the chaos control of the Buck-Boost converters [13][14][15].…”

Section: Introductionmentioning

confidence: 99%

Complex Dynamics and Hard Limiter Control of a Fractional-Order Buck-Boost System

Wang

2021

Mathematical Problems in Engineering

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Chaos and control analysis for the fractional-order nonlinear circuits is a recent hot topic. In this study, a fractional-order model is deduced from a Buck-Boost converter, and its discrete solution is obtained based on the Adomian decomposition method (ADM). Chaotic dynamic characteristics of the fractional-order system are investigated by the bifurcation diagram, 0-1 test, spectral entropy (SE) algorithm, and NIST test. Meanwhile, the control of the fractional-order Buck-Boost model is discussed through two different ways, namely, the intensity feedback and the hard limiter control. Specifically, the hard limiter control can be realized using a current limiter in the circuit, where the current limiter device is applied to control the branch current. The results show that the proposed fractional-order system has complex dynamic behaviors and potential application values in the engineering field.

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“…In addition, chaotic systems may be stable or unstable through some random inputs. These types of chaotic systems have been extensively investigated …”

Section: Introductionmentioning

confidence: 99%

Exponential synchronization of chaotic systems with stochastic noise via periodically intermittent control

Tong

Chen

et al. 2020

Intl J Robust & Nonlinear

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The problem of second-moment exponential synchronization is discussed for chaotic systems. Different from some existing results, a unified drive-response system is formulated, which involves stochastic noise and the time-varying delay. Meanwhile, the feedback controller is presented by the periodically intermittent control. By exploiting the Lyapunov stability theory, the improved reciprocally convex inequality and the Itô formula, several new sufficient conditions are obtained to make two systems synchronized. In addition, the controller is determined by the control period and the control width. Finally, simulation results illustrate that the designed controller achieves the desired performance. K E Y W O R D Schaotic systems, exponential synchronization, periodically intermittent control, stochastic noise, unified model 1 In the past years, the stabilization and synchronization of chaotic systems have gained much attention among researchers owing to its wide applications in many areas, 1-5 such as economics, secure communications, and biological sciences.As is known to all, chaotic systems have high nonlinear dynamic characteristics and strong randomness, and it is Abbreviations: ANA, antinuclear antibodies; APC, antigen-presenting cells; IRF, interferon regulatory factor. Int J Robust Nonlinear Control. 2020;30:2611-2624.wileyonlinelibrary.com/journal/rnc

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Stabilization of a class of cascade nonlinear switched systems with application to chaotic systems

Cited by 9 publications

References 34 publications

Robust $H_{\infty}$ Control for the Nonlinear Cascade Systems with Passive and Nonpassive Subsystems

Robust $H_{\infty}$ Control for the Nonlinear Cascade Systems with Passive and Nonpassive Subsystems

Complex Dynamics and Hard Limiter Control of a Fractional-Order Buck-Boost System

Exponential synchronization of chaotic systems with stochastic noise via periodically intermittent control

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Stabilization of a class of cascade nonlinear switched systems with application to chaotic systems

Cited by 9 publications

References 34 publications

Robust H ∞ Control for the Nonlinear Cascade Systems with Passive and Nonpassive Subsystems

Robust H ∞ Control for the Nonlinear Cascade Systems with Passive and Nonpassive Subsystems

Complex Dynamics and Hard Limiter Control of a Fractional-Order Buck-Boost System

Exponential synchronization of chaotic systems with stochastic noise via periodically intermittent control

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Product

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Robust $H_{\infty}$ Control for the Nonlinear Cascade Systems with Passive and Nonpassive Subsystems

Robust $H_{\infty}$ Control for the Nonlinear Cascade Systems with Passive and Nonpassive Subsystems