Chimera States in Networks of Nonlocally Coupled Hindmarsh–Rose Neuron Models
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In this article, the occurrence of chimera states for various coupling schemes in networks of two-dimensional and three-dimensional Hindmarsh-Rose oscillators, which represent realistic models of neuronal ensembles, was identified.Abstract:
We have identified the occurrence of chimera states for various coupling schemes in networks of two-dimensional and three-dimensional Hindmarsh–Rose oscillators, which represent realistic models of neuronal ensembles. This result, together with recent studies on multiple chimera states in nonlocally coupled FitzHugh–Nagumo oscillators, provide strong evidence that the phenomenon of chimeras may indeed be relevant in neuroscience applications. Moreover, our work verifies the existence of chimera states in coupled bistable elements, whereas to date chimeras were known to arise in models possessing a single stable limit cycle. Finally, we have identified an interesting class of mixed oscillatory states, in which desynchronized neurons are uniformly interspersed among the remaining ones that are either stationary or oscillate in synchronized motion.read more
Citations
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Hidden attractors in dynamical systems
Dawid Dudkowski,Sajad Jafari,Tomasz Kapitaniak,Nikolay Kuznetsov,Nikolay Kuznetsov,Gennady A. Leonov,Awadhesh Prasad +6 more
TL;DR: In this paper, the authors discuss the most representative examples of hidden attractors, discuss their theoretical properties and experimental observations, and also describe numerical methods which allow identification of the hidden attractor.
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Chimera states in neuronal networks: A review.
TL;DR: Chimera states have attracted ample attention of researchers that work at the interface of physics and life sciences as discussed by the authors, focusing on the relevance of different synaptic connections, and on the effects of different network structures and coupling setups.
Journal ArticleDOI
Synchronization patterns and chimera states in complex networks: Interplay of topology and dynamics
TL;DR: In this article, a plethora of novel chimera patterns arise if one goes beyond the Kuramoto phase oscillator model, which consist of coexisting spatial domains of coherent and incoherent dynamics in networks of identical oscillators.
Journal ArticleDOI
Robustness of chimera states for coupled FitzHugh-Nagumo oscillators.
TL;DR: It is shown that modifications of coupling topologies cause qualitative changes of chimera states: additional random links induce a shift of the stability regions in the system parameter plane, and gaps in the connectivity matrix result in a change of the multiplicity of incoherent regions of the chimera state.
Journal ArticleDOI
Chimera states in uncoupled neurons induced by a multilayer structure.
TL;DR: In this article, the authors studied the existence of chimera states in a network of neurons without any direct interactions but connected through another medium of neurons, forming a multilayer structure.
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