Two-memristor-based chaotic system and its extreme multistability reconstitution via dimensionality reduction analysis

Abstract This paper presents a two-memristor-based chaotic system by introducing two memristors into an existing chaotic jerk system. Such a memristive system possesses plane equilibrium therein, leading to the emergence of extreme multistability. Due to the existence of two zero eigenvalues for the plane equilibrium, it is extremely difficult to quantitatively explore the dynamical mechanism based on the original system model. For this reason, an equivalent dimensionality reduction model is obtained using state variable mapping (SVM) method. Consequently, the initials-dependent extreme multistability in the two-memristor-based chaotic system is reconstituted by the initial parameters-related dynamics in the dimensionality reduction model, upon which the exact prediction, analysis and control of extreme multistability is thereby executed through traditional quantitative analyses. Furthermore, PSIM circuit simulations based on a physical circuit are performed to confirm the extreme multistability. It is demonstrated that the initials-dependent extreme multistability can be reconstituted through dimensionality reduction analysis, which is efficient for exploring the inner mechanisms and further seeking possible applications of this special phenomenon.

[1]  Karthikeyan Rajagopal,et al.  Extreme multi-stability: When imperfection changes quality , 2018 .

[2]  Jacques Kengne,et al.  Uncertain destination dynamics of a novel memristive 4D autonomous system , 2018 .

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

[4]  Yunus Babacan,et al.  A spiking and bursting neuron circuit based on memristor , 2016, Neurocomputing.

[5]  Zhisen Wang,et al.  Dynamics analysis of Wien-bridge hyperchaotic memristive circuit system , 2018 .

[6]  Akif Akgul,et al.  Chaos-based application of a novel no-equilibrium chaotic system with coexisting attractors , 2017 .

[7]  Huagan Wu,et al.  State variable mapping method for studying initial-dependent dynamics in memristive hyper-jerk system with line equilibrium , 2018, Chaos, Solitons & Fractals.

[8]  Nikolay V. Kuznetsov,et al.  Hidden attractors in dynamical models of phase-locked loop circuits: Limitations of simulation in MATLAB and SPICE , 2017, Commun. Nonlinear Sci. Numer. Simul..

[9]  Paulo C. Rech,et al.  Period-adding and spiral organization of the periodicity in a Hopfield neural network , 2015, Int. J. Mach. Learn. Cybern..

[10]  Zhong Liu,et al.  Generalized Memory Element and Chaotic Memory System , 2013, Int. J. Bifurc. Chaos.

[11]  Ahmad Taher Azar,et al.  Multistability Analysis and Function Projective Synchronization in Relay Coupled Oscillators , 2018, Complex..

[12]  Guangyi Wang,et al.  Extreme multistability in a memristor-based multi-scroll hyper-chaotic system. , 2016, Chaos.

[13]  Fuhong Min,et al.  Extreme multistability analysis of memristor-based chaotic system and its application in image decryption , 2017 .

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

[15]  Zhenjiang Zhao,et al.  Multistability of complex-valued neural networks with time-varying delays , 2017, Appl. Math. Comput..

[16]  Viet-Thanh Pham,et al.  A new hidden chaotic attractor with extreme multi-stability , 2018 .

[17]  Guangyi Wang,et al.  A Sinusoidally Driven Lorenz System and Circuit Implementation , 2015 .

[18]  U. Feudel,et al.  Control of multistability , 2014 .

[19]  Cecilia Cabeza,et al.  Periodicity hubs and wide spirals in a two-component autonomous electronic circuit , 2013 .

[20]  Bocheng Bao,et al.  Multistability induced by two symmetric stable node-foci in modified canonical Chua’s circuit , 2017 .

[21]  Tao Jiang,et al.  Flux-Charge Analysis of Initial State-Dependent Dynamical Behaviors of a Memristor Emulator-Based Chua's Circuit , 2018, Int. J. Bifurc. Chaos.

[22]  Leon O. Chua,et al.  The Fourth Element , 2012, Proceedings of the IEEE.

[23]  Yu Zhang,et al.  Coexisting multiple attractors and riddled basins of a memristive system. , 2018, Chaos.

[24]  Shukai Duan,et al.  Memristor-Based Cellular Nonlinear/Neural Network: Design, Analysis, and Applications , 2015, IEEE Transactions on Neural Networks and Learning Systems.

[25]  Kehui Sun,et al.  Dynamical properties and complexity in fractional-order diffusionless Lorenz system , 2016 .

[26]  Guanrong Chen,et al.  Dynamic Analysis of Digital Chaotic Maps via State-Mapping Networks , 2014, IEEE Transactions on Circuits and Systems I: Regular Papers.

[27]  Bocheng Bao,et al.  Two-memristor-based Chua’s hyperchaotic circuit with plane equilibrium and its extreme multistability , 2017 .

[28]  Huagan Wu,et al.  Controlling extreme multistability of memristor emulator-based dynamical circuit in flux–charge domain , 2018 .

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

[30]  Joana G. Freire,et al.  Cyclic organization of stable periodic and chaotic pulsations in Hartley’s oscillator , 2014 .

[31]  J. Kengne,et al.  Dynamical analysis and multistability in autonomous hyperchaotic oscillator with experimental verification , 2018 .

[32]  Bocheng Bao,et al.  Multiple attractors in a non-ideal active voltage-controlled memristor based Chua's circuit , 2016 .

[33]  Yihua Hu,et al.  Flux–Charge Analysis of Two-Memristor-Based Chua's Circuit: Dimensionality Decreasing Model for Detecting Extreme Multistability , 2020, IEEE Transactions on Industrial Electronics.

[34]  Z. Njitacke Tabekoueng,et al.  Periodicity, chaos, and multiple attractors in a memristor-based Shinriki's circuit. , 2015, Chaos.

[35]  Fang Yuan,et al.  Chaotic oscillator containing memcapacitor and meminductor and its dimensionality reduction analysis. , 2017, Chaos.

[36]  Jacques Kengne,et al.  Dynamical analysis of a simple autonomous jerk system with multiple attractors , 2016 .

[37]  Guangyi Wang,et al.  Initial condition-dependent dynamics and transient period in memristor-based hypogenetic jerk system with four line equilibria , 2018, Commun. Nonlinear Sci. Numer. Simul..

[38]  Bocheng Bao,et al.  Memristor-Based Canonical Chua's Circuit: Extreme Multistability in Voltage-Current Domain and Its Controllability in Flux-Charge Domain , 2018, Complex..

[39]  Zhijun Li,et al.  A simple inductor-free memristive circuit with three line equilibria , 2018, Nonlinear Dynamics.

[40]  R. E. Amritkar,et al.  Experimental observation of extreme multistability in an electronic system of two coupled Rössler oscillators. , 2011, Physical review. E, Statistical, nonlinear, and soft matter physics.

[41]  Ling Zhou,et al.  Various Attractors, Coexisting Attractors and Antimonotonicity in a Simple Fourth-Order Memristive Twin-T Oscillator , 2018, Int. J. Bifurc. Chaos.