Entropy Analysis and Neural Network-Based Adaptive Control of a Non-Equilibrium Four-Dimensional Chaotic System with Hidden Attractors

Today, four-dimensional chaotic systems are attracting considerable attention because of their special characteristics. This paper presents a non-equilibrium four-dimensional chaotic system with hidden attractors and investigates its dynamical behavior using a bifurcation diagram, as well as three well-known entropy measures, such as approximate entropy, sample entropy, and Fuzzy entropy. In order to stabilize the proposed chaotic system, an adaptive radial-basis function neural network (RBF-NN)–based control method is proposed to represent the model of the uncertain nonlinear dynamics of the system. The Lyapunov direct method-based stability analysis of the proposed approach guarantees that all of the closed-loop signals are semi-globally uniformly ultimately bounded. Also, adaptive learning laws are proposed to tune the weight coefficients of the RBF-NN. The proposed adaptive control approach requires neither the prior information about the uncertain dynamics nor the parameters value of the considered system. Results of simulation validate the performance of the proposed control method.

[1]  Xingpeng Zhang,et al.  Adaptive fuzzy impulsive synchronization of chaotic systems with random parameters , 2017 .

[2]  P. Grassberger,et al.  Estimation of the Kolmogorov entropy from a chaotic signal , 1983 .

[3]  Jesus M. Munoz-Pacheco,et al.  Frequency limitations in generating multi-scroll chaotic attractors using CFOAs , 2014 .

[4]  L. Young Entropy in dynamical systems , 2003 .

[5]  Soheil Ganjefar,et al.  Variable structure fuzzy wavelet neural network controller for complex nonlinear systems , 2018, Appl. Soft Comput..

[6]  Bocheng Bao,et al.  Hidden extreme multistability in memristive hyperchaotic system , 2017 .

[7]  J. Sprott,et al.  Some simple chaotic flows. , 1994, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[8]  P. Cai,et al.  Hopf bifurcation and chaos control in a new chaotic system via hybrid control strategy , 2017 .

[9]  Mahdi Fakoor,et al.  Adaptive Fuzzy PID Control Strategy for Spacecraft Attitude Control , 2019, Int. J. Fuzzy Syst..

[10]  Huagan Wu,et al.  Coexisting infinitely many attractors in active band-pass filter-based memristive circuit , 2016 .

[11]  Yilmaz Uyaroglu,et al.  An Adaptive Neural Network Control Scheme for Stabilizing Chaos to the Stable Fixed Point , 2017, Inf. Technol. Control..

[12]  Nikolay V. Kuznetsov,et al.  Control of multistability in hidden attractors , 2015 .

[13]  Sundarapandian Vaidyanathan,et al.  Hidden attractors in a chaotic system with an exponential nonlinear term , 2015 .

[14]  Yasser Shekofteh,et al.  A New Chaotic System with a Self-Excited Attractor: Entropy Measurement, Signal Encryption, and Parameter Estimation , 2018, Entropy.

[15]  Leang-San Shieh,et al.  Hybrid robust discrete sliding mode control for generalized continuous chaotic systems subject to external disturbances , 2018 .

[16]  Bocheng Bao,et al.  Extreme multistability in a memristive circuit , 2016 .

[17]  Feng-Hsiag Hsiao,et al.  Robust H∞ fuzzy control of dithered chaotic systems , 2013, Neurocomputing.

[18]  Chao Wang,et al.  Indirect adaptive fuzzy wavelet neural network with self- recurrent consequent part for AC servo system. , 2017, ISA transactions.

[19]  Sundarapandian Vaidyanathan,et al.  A no-equilibrium hyperchaotic system with a cubic nonlinear term , 2016 .

[20]  Qun Ding,et al.  A New Two-Dimensional Map with Hidden Attractors , 2018, Entropy.

[21]  Jinde Cao,et al.  Adaptive synchronization of multiple uncertain coupled chaotic systems via sliding mode control , 2018, Neurocomputing.

[22]  Amirreza Kosari,et al.  Optimal FPID Control Approach for a Docking Maneuver of Two Spacecraft: Translational Motion , 2017 .

[23]  Akif Akgul,et al.  Complete analysis and engineering applications of a megastable nonlinear oscillator , 2018, International Journal of Non-Linear Mechanics.

[24]  Manoj Kumar Shukla,et al.  Stabilization of a class of fractional order chaotic systems via backstepping approach , 2017 .

[25]  Rongrong Wang,et al.  A new finding of the existence of hidden hyperchaotic attractors with no equilibria , 2014, Math. Comput. Simul..

[26]  Zhen Sun Synchronization of fractional-order chaotic systems with non-identical orders, unknown parameters and disturbances via sliding mode control , 2018, Chinese Journal of Physics.

[27]  Xin Wang,et al.  Adaptive Synchronization of Uncertain Chaotic Systems via Neural Network-Based Dynamic Surface Control Design , 2013, ISNN.

[28]  Chun-Fei Hsu Hermite-neural-network-based adaptive control for a coupled nonlinear chaotic system , 2012, Neural Computing and Applications.

[29]  José-Cruz Nuñez Pérez,et al.  FPGA realization of multi-scroll chaotic oscillators , 2015, Commun. Nonlinear Sci. Numer. Simul..

[30]  Christos Volos,et al.  Coexistence of hidden chaotic attractors in a novel no-equilibrium system , 2017 .

[31]  Olimpia Lombardi,et al.  About the Concept of Quantum Chaos , 2017, Entropy.

[32]  Christos Volos,et al.  Dynamics and circuit realization of a no-equilibrium chaotic system with a boostable variable , 2017 .

[33]  Viet-Thanh Pham,et al.  A New Chaotic Flow with Hidden Attractor: The First Hyperjerk System with No Equilibrium , 2018 .

[34]  Viet-Thanh Pham,et al.  A Novel No-Equilibrium Chaotic System with Multiwing Butterfly Attractors , 2015, Int. J. Bifurc. Chaos.

[35]  Sen Zhang,et al.  Generating one to four-wing hidden attractors in a novel 4D no-equilibrium chaotic system with extreme multistability. , 2018, Chaos.

[36]  Hadi Jahanshahi,et al.  Multi-objective optimized fuzzy-PID controllers for fourth order nonlinear systems , 2016 .

[37]  Nikolay V. Kuznetsov,et al.  Hidden attractors in Dynamical Systems. From Hidden oscillations in Hilbert-Kolmogorov, Aizerman, and Kalman Problems to Hidden Chaotic Attractor in Chua Circuits , 2013, Int. J. Bifurc. Chaos.

[38]  S. Pincus Approximate entropy (ApEn) as a complexity measure. , 1995, Chaos.

[39]  Wangxin Yu,et al.  Characterization of Surface EMG Signal Based on Fuzzy Entropy , 2007, IEEE Transactions on Neural Systems and Rehabilitation Engineering.

[40]  Saeed Farzami Sarcheshmeh,et al.  Chaotic satellite synchronization using neural and nonlinear controllers , 2017 .

[41]  T. Morrison,et al.  Dynamical Systems , 2021, Nature.

[42]  J. Richman,et al.  Physiological time-series analysis using approximate entropy and sample entropy. , 2000, American journal of physiology. Heart and circulatory physiology.

[43]  Julien Clinton Sprott,et al.  Megastability: Coexistence of a countable infinity of nested attractors in a periodically-forced oscillator with spatially-periodic damping , 2017 .

[44]  O. Rössler An equation for hyperchaos , 1979 .

[45]  Chih-Min Lin,et al.  Function-Link Fuzzy Cerebellar Model Articulation Controller Design for Nonlinear Chaotic Systems Using TOPSIS Multiple Attribute Decision-Making Method , 2018, Int. J. Fuzzy Syst..

[46]  Peyman Yadmellat,et al.  A recursive delayed output-feedback control to stabilize chaotic systems using linear-in-parameter neural networks , 2011 .

[47]  Qiang Lai,et al.  Generating Multiple Chaotic Attractors from Sprott B System , 2016, Int. J. Bifurc. Chaos.

[48]  Hadi Jahanshahi,et al.  Smooth control of HIV/AIDS infection using a robust adaptive scheme with decoupled sliding mode supervision , 2018, The European Physical Journal Special Topics.

[49]  Abdesselem Boulkroune,et al.  Neural adaptive quantized output-feedback control-based synchronization of uncertain time-delay incommensurate fractional-order chaotic systems with input nonlinearities , 2017, Neurocomputing.

[50]  Juan Yang,et al.  Sliding-Mode Synchronization Control for Uncertain Fractional-Order Chaotic Systems with Time Delay , 2015, Entropy.

[51]  Viet-Thanh Pham,et al.  A hyperchaotic memristor oscillator with fuzzy based chaos control and LQR based chaos synchronization , 2018, AEU - International Journal of Electronics and Communications.

[52]  Jessica Lowell Neural Network , 2001 .

[53]  S M Pincus,et al.  Approximate entropy as a measure of system complexity. , 1991, Proceedings of the National Academy of Sciences of the United States of America.

[54]  Cheng-Shion Shieh,et al.  Hybrid control for synchronizing a chaotic system , 2011 .

[55]  Roman Frigg,et al.  In What Sense is the Kolmogorov-Sinai Entropy a Measure for Chaotic Behaviour?—Bridging the Gap Between Dynamical Systems Theory and Communication Theory , 2004, The British Journal for the Philosophy of Science.

[56]  Jun Ma,et al.  Robust finite-time composite nonlinear feedback control for synchronization of uncertain chaotic systems with nonlinearity and time-delay , 2018, Chaos, Solitons & Fractals.

[57]  Julien Clinton Sprott,et al.  Elementary quadratic chaotic flows with no equilibria , 2013 .

[58]  Zhouchao Wei,et al.  Dynamical behaviors of a chaotic system with no equilibria , 2011 .

[59]  Christos Volos,et al.  A chaotic system with rounded square equilibrium and with no-equilibrium , 2017 .

[60]  Saleh Mobayen,et al.  Chaos synchronization of uncertain chaotic systems using composite nonlinear feedback based integral sliding mode control. , 2018, ISA transactions.

[61]  Sandeep Kaur,et al.  Uncertainty and disturbance estimator based robust synchronization for a class of uncertain fractional chaotic system via fractional order sliding mode control , 2018, Chaos, Solitons & Fractals.

[62]  Marta Borowska,et al.  Entropy-Based Algorithms in the Analysis of Biomedical Signals , 2015 .

[63]  C. Ahn Neural network ℋ∞ chaos synchronization , 2010 .

[64]  Shuyi Shao,et al.  Prescribed performance synchronization for uncertain chaotic systems with input saturation based on neural networks , 2018, Neural Computing and Applications.

[65]  Honglin Yu,et al.  Fuzzy synchronization of chaotic systems via intermittent control , 2018 .