Fractional-order memcapacitor-based Chua's circuit and its chaotic behaviour analysis

In this paper, a simulation model of the charge-controlled memcapacitor is realized, and fractional calculus is used to analyze it. An interesting phenomena found out is that the curve is bent downward as the parameter order-α decreases. And then, the fractional-order memcapacitor Chua's differential equations are presented. Theory analysis and simulation results show the influence of the fractional-order to the system dynamics. The nonlinear dynamics of the above fractional-order nonlinear system including phase graphs, time domain waveforms and bifurcation diagrams are studied in detail, during which many interesting phenomena are discovered. We observe that chaos seems to disappear as the order q decreases. Meanwhile, when q1 =3D q2 =3D q3 =3D 0.90, the chaos disappeared completely. Finally, corresponding bifurcation diagram of variable Y versus parameter q, q1, q2 and q3 are presented respectively, and get a conclusion that the order q3 has the greatest influence on Chaos than q1 and q2.

[1]  A. Luo,et al.  Fractional Dynamics and Control , 2011 .

[2]  Ivo Petrás,et al.  Fractional-Order Memristor-Based Chua's Circuit , 2010, IEEE Transactions on Circuits and Systems II: Express Briefs.

[3]  Zhigang Zeng,et al.  A Fractional-Order Chaotic Circuit Based on Memristor and Its Generalized Projective Synchronization , 2014, ICIC.

[4]  B. Achar,et al.  Dynamics of the fractional oscillator , 2001 .

[5]  Gangquan Si,et al.  Generalized modeling of the fractional-order memcapacitor and its character analysis , 2018, Commun. Nonlinear Sci. Numer. Simul..

[6]  Leon O. Chua,et al.  Memfractance: A Mathematical Paradigm for Circuit Elements with Memory , 2014, Int. J. Bifurc. Chaos.

[7]  D. Stewart,et al.  The missing memristor found , 2008, Nature.

[8]  Giuseppe Grassi,et al.  On the simplest fractional-order memristor-based chaotic system , 2012 .

[9]  H. Iu,et al.  Memcapacitor model and its application in chaotic oscillator with memristor. , 2017, Chaos.

[10]  M. Haeri,et al.  Synchronization of chaotic fractional-order systems via active sliding mode controller , 2008 .

[11]  J. A. Tenreiro Machado,et al.  Entropy Analysis of Integer and Fractional Dynamical Systems , 2010 .

[12]  Paul Woafo,et al.  Dynamics and synchronization analysis of coupled fractional-order nonlinear electromechanical systems , 2012 .

[13]  Guangyi Wang,et al.  Memcapacitor model and its application in a chaotic oscillator , 2016 .

[14]  RANCHAO WU,et al.  Dynamic behaviours and control of fractional-order memristor-based system , 2015 .

[15]  Gangquan Si,et al.  Characteristic analysis of fractional-order super-capacitors and batteries , 2017, 2017 29th Chinese Control And Decision Conference (CCDC).

[16]  Ahmed G. Radwan,et al.  Amplitude Modulation and Synchronization of Fractional-Order Memristor-Based Chua\'s Circuit , 2013 .

[17]  Zhang Han On the Generalization and Simulation of Fractional-order Chua's Circuit , 2015 .

[18]  Leon O. Chua,et al.  Circuit Elements With Memory: Memristors, Memcapacitors, and Meminductors , 2009, Proceedings of the IEEE.

[19]  Mohammad Saleh Tavazoei,et al.  Chaotic attractors in incommensurate fractional order systems , 2008 .

[20]  S. Westerlund,et al.  Capacitor theory , 1994 .

[21]  Chua Memristor-The Missing Circuit Element LEON 0 , 1971 .

[22]  Luigi Fortuna,et al.  Fractional Order Systems: Modeling and Control Applications , 2010 .

[23]  Giuseppe Grassi,et al.  Fractional-Order Chua's Circuit: Time-Domain Analysis, bifurcation, Chaotic Behavior and Test for Chaos , 2008, Int. J. Bifurc. Chaos.

[24]  王光义,et al.  Memcapacitor model and its application in a chaotic oscillator , 2016 .

[25]  Fang Yuan,et al.  Chaos in a Meminductor-Based Circuit , 2016, Int. J. Bifurc. Chaos.