Riddled Attraction Basin and Multistability in Three-Element-Based Memristive Circuit

By coupling a diode bridge-based second-order memristor and an active voltage-controlled memristor with a capacitor, a three-element-based memristive circuit is synthesized and its system model is then built. The boundedness of the three-element-based memristive circuit is theoretically proved by employing the contraction mapping principle. Besides, the stability distributions of equilibrium points are theoretically and numerically expounded in a 2D parameter plane. The results imply the memristive circuit has a zero unstable saddle focus and a pair of nonzero stable node-foci or unstable saddle-foci depending on the considered parameters. The dynamical behaviors include point attractor, period, chaos, coexisting bifurcation mode, period-doubling bifurcation route, and crisis scenarios, which are explored using some common dynamical methods. Of particular concern, riddled attraction basins and multistability are uncovered under two sets of specified model parameters nearing the tiny neighborhood of crisis scenarios by local attraction basins and phase plane plots. The riddled attraction basins with island-like structure demonstrate that their dynamical behaviors are extremely sensitive to the initial conditions, resulting in the coexistence of limit cycles with period-2 and period-6, as well as the coexistence of period-1 limit cycles and single-scroll chaotic attractors. Moreover, a feasible on-breadboard hardware circuit is manually made and the experimental measurements are executed, upon which phase plane trajectories for some discrete model parameters are captured to further confirm the numerically simulated ones.

[1]  Mo Chen,et al.  Three-Dimensional Memristive Hindmarsh-Rose Neuron Model with Hidden Coexisting Asymmetric Behaviors , 2018, Complex..

[2]  Fernando Corinto,et al.  Memristive diode bridge with LCR filter , 2012 .

[3]  Leon O. Chua,et al.  Memristor oscillators , 2008, Int. J. Bifurc. Chaos.

[4]  Huagan Wu,et al.  Memristor initial boosting behaviors in a two-memristor-based hyperchaotic system , 2019, Chaos, Solitons & Fractals.

[5]  Julien Clinton Sprott,et al.  Offset Boosting for Breeding Conditional Symmetry , 2018, Int. J. Bifurc. Chaos.

[6]  Shaoqing Zhang,et al.  An extreme event of sea-level rise along the Northeast coast of North America in 2009–2010 , 2015, Nature Communications.

[7]  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..

[8]  Luigi Fortuna,et al.  A chaotic circuit based on Hewlett-Packard memristor. , 2012, Chaos.

[9]  Qiang Lai,et al.  Various Types of Coexisting Attractors in a New 4D Autonomous Chaotic System , 2017, Int. J. Bifurc. Chaos.

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

[11]  Jun Ma,et al.  Model of electrical activity in a neuron under magnetic flow effect , 2016 .

[12]  Leon O. Chua,et al.  Neural Synaptic Weighting With a Pulse-Based Memristor Circuit , 2012, IEEE Transactions on Circuits and Systems I: Regular Papers.

[13]  Da-Ren He,et al.  A riddled basin escaping crisis and the universality in an integrate-and-fire circuit , 2018, Physica A: Statistical Mechanics and its Applications.

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

[15]  Dongsheng Yu,et al.  Hyperchaos in a memristor-Based Modified Canonical Chua's Circuit , 2012, Int. J. Bifurc. Chaos.

[16]  Zhang Xiuzai,et al.  Identification of chaotic memristor systems based on piecewise adaptive Legendre filters , 2015 .

[17]  Huagan Wu,et al.  Bi-Stability in an Improved Memristor-Based Third-Order Wien-Bridge Oscillator , 2019 .

[18]  Jacques Kengne,et al.  Coexistence of multiple attractors and crisis route to chaos in a novel memristive diode bidge-based Jerk circuit , 2016 .

[19]  Leon O. Chua,et al.  Three Fingerprints of Memristor , 2013, IEEE Transactions on Circuits and Systems I: Regular Papers.

[20]  Ronald Tetzlaff,et al.  A class of versatile circuits, made up of standard electrical components, are memristors , 2016, Int. J. Circuit Theory Appl..

[21]  Yang Feng,et al.  Hybrid State Variable Incremental Integral for Reconstructing Extreme Multistability in Memristive Jerk System with Cubic Nonlinearity , 2019, Complex..

[22]  Huagan Wu,et al.  Chaotic and periodic bursting phenomena in a memristive Wien-bridge oscillator , 2016 .

[23]  Qiang Lai,et al.  Dynamic analysis, circuit realization, control design and image encryption application of an extended Lü system with coexisting attractors , 2018, Chaos, Solitons & Fractals.

[24]  Leon O. Chua,et al.  Memristor Emulator for Memristor Circuit Applications , 2012, IEEE Transactions on Circuits and Systems I: Regular Papers.

[25]  P. Philominathan,et al.  Chaotic Dynamics and Application of LCR Oscillators Sharing Common Nonlinearity , 2016, Int. J. Bifurc. Chaos.

[26]  Arindam Saha,et al.  Riddled basins of attraction in systems exhibiting extreme events. , 2017, Chaos.

[27]  Bocheng Bao,et al.  Crisis‐induced coexisting multiple attractors in a second‐order nonautonomous memristive diode bridge‐based circuit , 2018, Int. J. Circuit Theory Appl..

[28]  Lixiang Li,et al.  Synchronization of Multi-links Memristor-Based Switching Networks Under Uniform Random Attacks , 2017, Neural Processing Letters.

[29]  Huagan Wu,et al.  A Simple Third-Order Memristive Band Pass Filter Chaotic Circuit , 2017, IEEE Transactions on Circuits and Systems II: Express Briefs.

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

[31]  Yihua Hu,et al.  Non-Autonomous Second-Order Memristive Chaotic Circuit , 2017, IEEE Access.

[32]  Christos Volos,et al.  A Memristive Hyperchaotic System without Equilibrium , 2014, TheScientificWorldJournal.

[33]  A. Wolf,et al.  Determining Lyapunov exponents from a time series , 1985 .

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

[35]  Guanrong Chen,et al.  Doubling the coexisting attractors. , 2019, Chaos.

[36]  Yang Hl One-side riddled basin below and beyond the blowout bifurcation , 2000 .

[37]  Sen Zhang,et al.  Generating hidden extreme multistability in memristive chaotic oscillator via micro‐perturbation , 2018, Electronics Letters.

[38]  Fernando Corinto,et al.  Analysis of current–voltage characteristics for memristive elements in pattern recognition systems , 2012, Int. J. Circuit Theory Appl..

[39]  Jacques Kengne,et al.  Asymmetric Double Strange Attractors in a Simple Autonomous Jerk Circuit , 2018, Complex..

[40]  Awadhesh Prasad,et al.  Driving-induced multistability in coupled chaotic oscillators: Symmetries and riddled basins. , 2016, Chaos.

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

[42]  Leon O. Chua,et al.  Everything You Wish to Know About Memristors but Are Afraid to Ask , 2015, Handbook of Memristor Networks.

[43]  Fei Yu,et al.  Analysis and FPGA Realization of a Novel 5D Hyperchaotic Four-Wing Memristive System, Active Control Synchronization, and Secure Communication Application , 2019, Complex..

[44]  T. A. Burton,et al.  Stability by Fixed Point Theory for Functional Differential Equations , 2006 .

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

[46]  Julien Clinton Sprott,et al.  Coexistence of Point, periodic and Strange attractors , 2013, Int. J. Bifurc. Chaos.

[47]  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..

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

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

[50]  Bocheng Bao,et al.  Chaotic bursting in memristive diode bridge-coupled Sallen-Key lowpass filter , 2017 .

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

[52]  J. Yang,et al.  Memristors with diffusive dynamics as synaptic emulators for neuromorphic computing. , 2017, Nature materials.

[53]  Mo Chen,et al.  Dynamical Effects of Neuron Activation Gradient on Hopfield Neural Network: Numerical Analyses and Hardware Experiments , 2019, Int. J. Bifurc. Chaos.

[54]  Yang One-side riddled basin below and beyond the blowout bifurcation , 2000, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.