Document Type : Original Article
Authors
1 Department of Physics, Doroud, Islamic Azad University, Doroud, Iran
2 Department of Physics, University of Qom
Abstract
Asymmetry and heterogeneity have a strong influence on coupled oscillator dynamics. Synchronization and formation of chimera states in three asymmetric RF coupled SQUIDs, in an external magnetic flux are investigated numerically. The effect of the geometric and physical characteristics of the system such as the radius of the SQUID ring, the distance between two rings, the coupling coefficient of the system in the formation of synchrony between SQUID the formation of Chimera and chaotic states of the system have been investigated. Periodic dynamics as well as hyperchaos between two SQUIDs of the trimer is identified and characterized using the complete Lyapunov spectrum and the Kaplan–Yorke dimension of the system and appropriate measures. Poincaré maps of the system are plotted before, near, and after the resonance frequency to study its dynamical behavior. The influence of the frequency of the external driving flux as well as its amplitude on the synchronization of the system as well as the conditions for the formation of Chimera states have been determined.
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- H K M Tanaka, Rep. 12 (2022) 7078.
- P Tass, et al., Rev. Lett., 81(15) 3291.
- L Garcia Dominguez, et al., Neurosci. 25, 35 (2005) 8077.
- N W F Bode, et al., R. Soc. B, 277, 1697 (2010) 3065.
- J Guckenheimer and P Holmes, “Nonlinear Oscillations, Dynamical Systems and Bifurcations of Vector Fields”. New York: Springer (1983).
- A Arenas, et al., Rep. 469 (2008) 93.
- Y Kuramoto and B Dorjsuren, arXiv:cond-mat/0210694 (2002).
- D M Abrams and S H Strogatz, Rev. Lett., 93, 17 (2004) 174102.
- A Malekifar, et al., J. Mod. Phys. B, (2022).
- J Xu, L Chen, and V K Varadan, ‟Nanomedicine: Design and Applications of Magnetic Nanomaterials”, Nanosensors and Nanosystems. Wiley (2008).
- F Dörfler and F Bullo, Automatica, 50, 6 (2014) 1539.
- J Clarke and A I Braginski, “The SQUID Handbook: Fundamentals and Technology of SQUIDs and SQUID Systems”, Wiley-VCH (2004).
- A H Nayfeh and D T. Mook, “Nonlinear Oscillations”. Wiley-VCH (1995).
- C M Kim et al., Lett. A, 320 (2003) 39.
- S K Joshi, S Sen, and I N Kar, IFAC-PapersOnLine, 49, 1 (2016) 320.
- M Sandri, J., 6, 3 (1996) 78.
- H Kaplan and J A Yorke, “Lecture notes in mathematics”, 730, )1979 (
- J Shena, N Lazarides, and J Hizanidis, Chaos, 31 (2021) 093102.
- N Lazarides and G P Tsironis, Technol. 26 (2013) 084006.
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