Antimonotonicity and multistability in a fractional order memristive chaotic oscillator

A memristor diode bridge chaotic circuit is proposed in this paper. The proposed oscillator has only one nonlinear element in the form of memristor. Dynamical properties of the proposed oscillator are investigated. The fractional order model of the oscillator is designed using Grunwald–Letnikov (GL) method. Bifurcation diagrams are plotted which shows that the proposed oscillator exhibits multistability. Finally, the antimonotonicity property of the fractional order oscillator is discussed in detail with two control parameters. Such property has not been explored for fractional order systems before.

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

[2]  Ivo Petras,et al.  Control of Fractional-Order Chaotic Systems , 2011 .

[3]  Viet-Thanh Pham,et al.  From Wang-Chen System with Only One Stable Equilibrium to a New Chaotic System Without Equilibrium , 2017, Int. J. Bifurc. Chaos.

[4]  Binoy Krishna Roy,et al.  Coexistence of asymmetric hidden chaotic attractors in a new simple 4-D chaotic system with curve of equilibria , 2017 .

[5]  Huagan Wu,et al.  Symmetric periodic bursting behavior and bifurcation mechanism in a third-order memristive diode bridge-based oscillator , 2018 .

[6]  Sajad Jafari,et al.  Fractional Order Synchronous Reluctance Motor: Analysis, Chaos Control and FPGA Implementation , 2018 .

[7]  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..

[8]  S. Jafari,et al.  A chaotic memcapacitor oscillator with two unstable equilibriums and its fractional form with engineering applications , 2018 .

[9]  Switching-induced Wada basin boundaries in the Hénon map , 2013 .

[10]  Julien Clinton Sprott,et al.  Simple Chaotic flows with One Stable equilibrium , 2013, Int. J. Bifurc. Chaos.

[11]  Viet-Thanh Pham,et al.  A Modified Multistable Chaotic Oscillator , 2018, Int. J. Bifurc. Chaos.

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

[13]  Julien Clinton Sprott,et al.  An infinite 2-D lattice of strange attractors , 2017 .

[14]  Bashir Ahmad,et al.  Chaos and multi-scroll attractors in RCL-shunted junction coupled Jerk circuit connected by memristor , 2018, PloS one.

[15]  Chun-Lai Li,et al.  Adaptive Sliding Mode Control for Synchronization of a Fractional-Order Chaotic System , 2013 .

[16]  Marius-F. Danca,et al.  Lyapunov exponents of a class of piecewise continuous systems of fractional order , 2014, 1408.5676.

[17]  Guanwei Luo,et al.  Wada basin dynamics of a shallow arch oscillator with more than 20 coexisting low-period periodic attractors , 2014 .

[18]  CHUNLAI LI,et al.  Adaptive control and synchronization of a fractional-order chaotic system , 2013 .

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

[20]  Julien Clinton Sprott,et al.  Simple chaotic flows with a line equilibrium , 2013 .

[21]  Zhong Liu,et al.  Generalized Memristor Consisting of Diode Bridge with First Order Parallel RC Filter , 2014, Int. J. Bifurc. Chaos.

[22]  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..

[23]  S. Erlich,et al.  Convergences of adaptive block simultaneous iteration method for eigenstructure decomposition , 1994, Signal Process..

[24]  A. G. Rigas,et al.  Time series analysis in chaotic diode resonator circuit , 2006 .

[25]  Viet-Thanh Pham,et al.  Generating a Chaotic System with One Stable Equilibrium , 2017, Int. J. Bifurc. Chaos.

[26]  Christos Volos,et al.  A fractional system with five terms: analysis, circuit, chaos control and synchronization , 2018, International Journal of Electronics.

[27]  Christos Volos,et al.  Dynamics, FPGA realization and application of a chaotic system with an infinite number of equilibrium points , 2017 .

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

[29]  Viet-Thanh Pham,et al.  A new nonlinear oscillator with infinite number of coexisting hidden and self-excited attractors , 2018 .

[30]  Bocheng Bao,et al.  Numerical and experimental confirmations of quasi-periodic behavior and chaotic bursting in third-order autonomous memristive oscillator , 2018 .

[31]  Binoy Krishna Roy,et al.  The simplest 4-D chaotic system with line of equilibria, chaotic 2-torus and 3-torus behaviour , 2017 .

[32]  Leon O. Chua,et al.  Scenario of the Birth of Hidden Attractors in the Chua Circuit , 2017, Int. J. Bifurc. Chaos.

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

[34]  Viet-Thanh Pham,et al.  Is that Really Hidden? The Presence of Complex Fixed-Points in Chaotic Flows with No Equilibria , 2014, Int. J. Bifurc. Chaos.

[35]  Nikolay V. Kuznetsov,et al.  Hidden chaotic sets in a Hopfield neural system , 2017 .

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

[37]  Jacques Kengne,et al.  Antimonotonicity, chaos and multiple coexisting attractors in a simple hybrid diode-based jerk circuit , 2017 .

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

[39]  Julien Clinton Sprott,et al.  Simple chaotic 3D flows with surfaces of equilibria , 2016 .

[40]  Irene M. Moroz,et al.  Degenerate Hopf bifurcations, hidden attractors, and control in the extended Sprott E system with only one stable equilibrium , 2014 .

[41]  Viet-Thanh Pham,et al.  A new four-dimensional system containing chaotic or hyper-chaotic attractors with no equilibrium, a line of equilibria and unstable equilibria , 2018, Chaos, Solitons & Fractals.

[42]  Julien Clinton Sprott,et al.  A Simple Chaotic Flow with a Plane of Equilibria , 2016, Int. J. Bifurc. Chaos.

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

[44]  Basin boundaries with nested structure in a shallow arch oscillator , 2014 .

[45]  Binoy Krishna Roy,et al.  Second order adaptive time varying sliding mode control for synchronization of hidden chaotic orbits in a new uncertain 4-D conservative chaotic system , 2018, Trans. Inst. Meas. Control.

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

[47]  Binoy Krishna Roy,et al.  New family of 4-D hyperchaotic and chaotic systems with quadric surfaces of equilibria , 2018 .

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

[49]  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..

[50]  Huagan Wu,et al.  Coexistence of multiple bifurcation modes in memristive diode-bridge-based canonical Chua’s circuit , 2018 .

[51]  Yongxiang Zhang Wada basins of strange nonchaotic attractors in a quasiperiodically forced system , 2013 .

[52]  Ivo,et al.  [Nonlinear Physical Science] Fractional-Order Nonlinear Systems Volume 0 || Stability of Fractional-Order Systems , 2011 .

[53]  Christos Volos,et al.  A new transiently chaotic flow with ellipsoid equilibria , 2018 .

[54]  Christos Volos,et al.  A New Chaotic System With Stable Equilibrium: From Theoretical Model to Circuit Implementation , 2017, IEEE Access.

[55]  Kehui Sun,et al.  Design of multiwing-multiscroll grid compound chaotic system and its circuit implementation , 2018, International Journal of Modern Physics C.

[56]  Christos Volos,et al.  Dynamics and circuit of a chaotic system with a curve of equilibrium points , 2017 .