English

Basin stability for chimera states

Chaotic Dynamics 2017-05-29 v1 Biological Physics Neurons and Cognition

Abstract

Chimera states, namely complex spatiotemporal patterns that consist of coexisting domains of spatially coherent and incoherent dynamics, are investigated in a network of coupled identical oscillators. These intriguing spatiotemporal patterns were first reported in nonlocally coupled phase oscillators, and it was shown that such mixed type behavior occurs only for specific initial conditions in nonlocally and globally coupled networks. The influence of initial conditions on chimera states has remained a fundamental problem since their discovery. In this report, we investigate the robustness of chimera states together with incoherent and coherent states in dependence on the initial conditions. For this, we use the basin stability method which is related to the volume of the basin of attraction, and we consider nonlocally and globally coupled time-delayed Mackey-Glass oscillators as example. Previously, it was shown that the existence of chimera states can be characterized by mean phase velocity and a statistical measure, such as the strength of incoherence, by using well prepared initial conditions. Here we show further how the coexistence of different dynamical states can be identified and quantified by means of the basin stability measure over a wide range of the parameter space.

Keywords

Cite

@article{arxiv.1704.05301,
  title  = {Basin stability for chimera states},
  author = {Sarbendu Rakshit and Bidesh K. Bera and Matjaz Perc and Dibakar Ghosh},
  journal= {arXiv preprint arXiv:1704.05301},
  year   = {2017}
}

Comments

10 pages, 8 figures; accepted for publication in Scientific Reports

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