One-to-four-wing hyperchaotic fractional-order system and its circuit realization

2023

Fractal Fract

Interest in studies on fractional calculus and its applications has greatly increased in recent years. Fractional-order analysis has the potential to enhance the dynamic structure of chaotic systems. This study presents the implementation of a lower-order fractional electronic circuit using standard components for the Sprott K system. To our knowledge, there are no chaotic circuit realizations in the literature where the value of a fractional-order parameter is approximately 0.8, making this study pioneering in this aspect. Additionally, various numerical analyses of the system are conducted, including chaotic time series and phase planes, Lyapunov exponents, spectral entropy (SE), and bifurcation diagrams, in order to examine its dynamic characteristics and complexity. As anticipated, the voltage outputs obtained from the oscilloscope demonstrated good agreement with both the numerical analysis and PSpice simulations.

Section: Introductionmentioning

confidence: 99%

Circuit Realization of the Fractional-Order Sprott K Chaotic System with Standard Components

2023

Fractal Fract

“…The chaos that can be observed in many nonlinear systems depicts more complex behavior with fractional-order analysis (Ahmad and Sprott, 2003; Liu et al, 2021). Recently, many researchers have been interested in the study of fractional-order chaotic systems (Akgül et al, 2022; Chen et al, 2013; Li et al, 2020; Peng et al, 2020; Trikha et al, 2022; Zhang and Zhou, 2007). The main reason for this attraction lies in the fact that some differential systems’ behavior varies chaotically in the case of particular fractional orders.…”

Section: Introductionmentioning

confidence: 99%

Fractional-Order sliding mode control of a 4D memristive chaotic system

Journal of Vibration and Control

Çalgan

Demirtaş

2023

Chaotic systems depict complex dynamics, thanks to their nonlinear behaviors. With recent studies on fractional-order nonlinear systems, it is deduced that fractional-order analysis of a chaotic system enriches its dynamic behavior. Therefore, the investigation of the chaotic behavior of a 4D memristive Chen system is aimed in this study by taking the order of the system as fractional. The nonlinear behavior of the system is observed numerically by comparing the fractional-order bifurcation diagrams and Lyapunov Exponents Spectra with 2D phase portraits. Based on these analyses, two different fractional orders (i.e., q = 0.948 and q = 0.97) are determined where the 4D memristive system shows chaotic behavior. Furthermore, a single state fractional-order sliding mode controller (FOSMC) is designed to maintain the states of the fractional-order memristive chaotic system on the equilibrium points. Then, control method results are obtained by both numerical simulations and different illustrative experiments of microcontroller-based realization. As expected, voltage outputs of the microcontroller-based realization are in good agreement with the time series of numerical simulations.

“…Even a small change in the fractional order of a chaotic system can lead to entirely new bifurcation diagrams. Therefore, in recent years, researchers have studied numerous implementations of chaotic systems in both digital and analog domains, considering different fractional-order values (Yang and Wang 2021;Wang et al 2021;Li et al 2020;Gokyildirim et al 2023;Liu et al 2021;Chen et al 2013;Pham et al 2017). Gokyildirim presented an electronic circuit for the Sprott K system using discrete circuit elements with a fractional-order value of 0.8 (Gokyildirim 2023).…”

Section: Introductionmentioning

confidence: 99%

Dynamical Analysis and Electronic Circuit Implementation of Fractional-order Chen System

Chaos Theory and Applications

2023

In recent years, there has been a significant surge in interest in studies related to fractional calculus and its applications. Fractional-order analysis holds the potential to enhance the dynamic structure of chaotic systems. This study focuses on the dynamic analysis of the Chen system with low fractional-order values and its fractional-order electronic circuit. Notably, there is a lack of studies about chaotic electronic circuits in the literature with a fractional-order parameter value equal to 0.8, which makes this study pioneering in this regard. Moreover, various numerical analyses are presented to investigate the system's dynamic characteristics and complexity, such as chaotic phase planes and bifurcation diagrams. As anticipated, the voltage outputs obtained from PSpice simulations demonstrated good agreement with the numerical analysis.