Chaos in a Financial System with Fractional Order and Its Control via Sliding Mode

Dousseh, Paul Yaovi; AinamonCyrille,; Miwadinou, C. H.; Vincent, MonwanouAdjimon; Bio, Chabi OrouJean

doi:10.1155/2021/4636658

Cited by 11 publications

(4 citation statements)

References 53 publications

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“…With the recent increase of studies and experiments with fractional order systems, the possibilities of finding new behaviors and better descriptions of natural phenomena are a recurring theme in the literature [22][23][24][25][26][27][28][29][30]. However, the use of this numerical tool has been neglected because it is used as a dynamical validation mechanism and the effects and physical implications associated with the use of fractional order derivatives are ignored.…”

Section: Introductionmentioning

confidence: 99%

Multistability route in a PWL multi-scroll system through fractional-order derivatives

Echenausía-Monroy

Gilardi-Velázquez

Wang

et al. 2022

Chaos, Solitons & Fractals

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Section: Introductionmentioning

confidence: 99%

Multistability route in a PWL multi-scroll system through fractional-order derivatives

Echenausía-Monroy

Gilardi-Velázquez

Wang

et al. 2022

Chaos, Solitons & Fractals

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“…Moreover, considering the global stability and not paying attention to issues such as stimulus saturation and the validity region of state variables is another challenge in this field. In practical applications, actuator saturation is one of the most common nonlinear control inputs encountered in system design [5][6][7]. In particular, the presence of input constraints as a symbol of the physical limitations of control capacity is unavoidable in most stimuli.…”

Section: Introductionmentioning

confidence: 99%

Nonsingular Terminal Sliding Mode Control Based on Adaptive Barrier Function for nth-Order Perturbed Nonlinear Systems

et al. 2021

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In this study, an adaptive nonsingular finite time control technique based on a barrier function terminal sliding mode controller is proposed for the robust stability of nth-order nonlinear dynamic systems with external disturbances. The barrier function adaptive terminal sliding mode control makes the convergence of tracking errors to a region near zero in the finite time. Moreover, the suggested method does not need the information of upper bounds of perturbations which are commonly applied to the sliding mode control procedure. The Lyapunov stability analysis proves that the errors converge to the determined region. Last of all, simulations and experimental results on a complex new chaotic system with a high Kaplan–Yorke dimension are provided to confirm the efficacy of the planned method. The results demonstrate that the suggested controller has a stronger tracking than the adaptive controller and the results are satisfactory with the application of the controller based on chaotic synchronization on the chaotic system.

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“…Nowadays, the control and synchronization of nonlinear systems are the focus of many research studies in a variety of fields [13][14][15]. Some effective controllers have been designed to control and synchronize the fractional-order chaotic systems such as the coupling controller [16], adaptive controllers [17], linear feedback controllers [18], sliding mode controllers [19], fractional order PID controllers [20,21], and so on.…”

Section: Introductionmentioning

confidence: 99%

Dynamics of Fractional-Order Digital Manufacturing Supply Chain System and Its Control and Synchronization

Zheng

Yuan

2021

Fractal Fract

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Digital manufacturing is widely used in the production of automobiles and aircrafts, and plays a profound role in the whole supply chain. Due to the long memory property of demand, production, and stocks, a fractional-order digital manufacturing supply chain system can describe their dynamics more precisely. In addition, their control and synchronization may have potential applications in the management of real-word supply chain systems to control uncertainties that occur within it. In this paper, a fractional-order digital manufacturing supply chain system is proposed and solved by the Adomian decomposition method (ADM). Dynamical characteristics of this system are studied by using a phase portrait, bifurcation diagram, and a maximum Lyapunov exponent diagram. The complexity of the system is also investigated by means of SE complexity and C0 complexity. It is shown that the complexity results are consistent with the bifurcation diagrams, indicating that the complexity can reflect the dynamical properties of the system. Meanwhile, the importance of the fractional-order derivative in the modeling of the system is shown. Moreover, to further investigate the dynamics of the fractional-order supply chain system, we design the feedback controllers to control the chaotic supply chain system and synchronize two supply chain systems, respectively. Numerical simulations illustrate the effectiveness and applicability of the proposed methods.

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Chaos in a Financial System with Fractional Order and Its Control via Sliding Mode

Cited by 11 publications

References 53 publications

Multistability route in a PWL multi-scroll system through fractional-order derivatives

Multistability route in a PWL multi-scroll system through fractional-order derivatives

Nonsingular Terminal Sliding Mode Control Based on Adaptive Barrier Function for nth-Order Perturbed Nonlinear Systems

Dynamics of Fractional-Order Digital Manufacturing Supply Chain System and Its Control and Synchronization

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