Nonlinear response of chemical reaction dynamics

Hübler, Alfred; Friedl, Andrew P.

doi:10.1002/cplx.21473

Cited by 6 publications

(2 citation statements)

References 5 publications

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“…In recent years, nonlinear modeling garnered the attention of scientists and engineers as these techniques are flexible and, secondly, most of the systems are nonlinear inherently [25,26]. The main specific of the nonlinear systems is that output does not change in proportion with the input variations [27].…”

Section: Introductionmentioning

confidence: 99%

Block-oriented system identification for nonlinear modeling of all-solid-state Li-ion battery technology

Firouz

Goutam

Soult

et al. 2020

Journal of Energy Storage

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Section: Introductionmentioning

confidence: 99%

Block-oriented system identification for nonlinear modeling of all-solid-state Li-ion battery technology

Firouz

Goutam

Soult

et al. 2020

Journal of Energy Storage

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“…This idea of chaos synchronization was first introduced in [1]. After the remarkable work [1], chaos synchronization has been widely investigated in the relevant literature [2][3][4]. At present, chaos synchronization has received increasing interest in many scientific disciplines, such as chemical processes and biological systems [5], cryptosystem [6], information processing [7], secure communications [8], and many physical systems [9].…”

Section: Introductionmentioning

confidence: 99%

Controller Parameter Optimization for the Robust Synchronization of Chaotic Systems with Known and Unknown Parameters

Ahmad

Saaban

Ibrahim

2017

J. Uncertain. Anal. Appl.

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In this paper, a synchronization problem of a three-dimensional (3-D) Coullete chaotic system using the active-and adaptive-based synchronization control techniques is addressed. Based on the Routh-Hurwitz criterion and using the active control algorithm, a single control function is considered and a computational study is performed to identify the correct balance between the converging rates of the synchronization error signals to the origin and magnitude of the linear controlling parameters (LCPs) for the globally exponential synchronization (GES) between two identical 3-D Coullete chaotic systems. In order to achieve the complete synchronization (CS) objective with unknown model uncertainties, external disturbances, and unknown time-varying parameters, a novel nonlinear adaptive synchronous controller is proposed and suitable adaptive laws of time-varying parameters are designed that accomplish the asymptotic synchronization between two identical uncertain 3-D Coullete chaotic systems. The two synchronizing controlling approaches are applied to investigate the CS phenomenon, and the results are compared. Open research problems are also discussed. All simulations results are carried out to validate the effectiveness of the proposed synchronization control approaches by using Mathematica 10.0.

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Global chaos synchronization of new chaotic system using linear active control

Ahmad

Saaban

Ibrahim³

et al. 2014

Complexity

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Chaos synchronization is a procedure where one chaotic oscillator is forced to adjust the properties of another chaotic oscillator for all future states. This research paper studies and investigates the global chaos synchronization problem of two identical chaotic systems and two non‐identical chaotic systems using the linear active control technique. Based on the Lyapunov stability theory and using the linear active control technique, the stabilizing controllers are designed for asymptotically global stability of the closed‐loop system for both identical and non‐identical synchronization. Numerical simulations and graphs are imparted to justify the efficiency and effectiveness of the proposed scheme. All simulations have been done by using mathematica 9. © 2014 Wiley Periodicals, Inc. Complexity 21: 379–386, 2015

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Nonlinear response of chemical reaction dynamics

Cited by 6 publications

References 5 publications

Block-oriented system identification for nonlinear modeling of all-solid-state Li-ion battery technology

Block-oriented system identification for nonlinear modeling of all-solid-state Li-ion battery technology

Controller Parameter Optimization for the Robust Synchronization of Chaotic Systems with Known and Unknown Parameters

Global chaos synchronization of new chaotic system using linear active control

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