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Home > ACTATTPU > Vol. 9 (2019) > Iss. 3

 

Acta of Turin Polytechnic University in Tashkent

Abstract

In this work we have categorized several types of Synchro-chimera states, and their properties. We chose parameters μ and α near to the critical point, and calculate synchronization time S for the time intervals. Our calculation shows that different types of Synchro-chimera states are scatter around the critical point.

First Page

14

Last Page

17

References

  1. Y. Kuramoto, Chemical Oscillations, Waves and Turbulence. Springer, New York. (1984)
  2. Y. Kuramoto and D.Battogtokh, Nonlinear Phenomenon of Complex Systems. Physical Review E, 5, 380 (2002)
  3. D. M. Abrams and S. H. Strogatz, Chimera States for Coupled Oscillators. Physical Review Letter, 93, 174102 (2004)
  4. J. Hizanidis,N.E.Kouvaris,G. Zamora-Lopez, A. Diaz- Guilera, and C.Antopoulos, Chimera-like States in Modular Neural Networks. Scientific Report, 6, 19845 (2016)
  5. P. Ashwin and O. Burylko, Weak chimeras in minimal networks of coupled phase oscillators. Chaos, 25, 013106 (2015)
  6. Yuri Maistrenko, Serhiy Brezetsky, Patrycja Jaros, Roman Levchenko, Tomasz Kapitaniak, Smallest chimera states. Physical Review E . 95, 010203(R) (2017)
  7. Introduction to Synchro-chimera states. The Annual conference and exhibition of the Turin Polytechnic University in Tashkent. April 26, 2019.

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