Chimera states formed via a two-level synchronization mechanism

Abstract: Chimera states, which consist of coexisting synchronous and asynchronous domains in networks of coupled oscillators, are in the focus of attention for over a decade. Although chimera morphology and properties have been investigated in a number of models, the mechanism responsible for their formation is still not well understood. To shed light in the chimera producing mechanism, in the present study we introduce an oscillatory model with variable frequency governed by a 3rd order equation. In this model single oscillators are constructed as bistable and depending on the initial conditions their frequency may result in one of the two stable fixed points, $\omega _l$ and $\omega _h $ (two-level synchronization). Numerical simulations demonstrate that these oscillators organize in domains with alternating frequencies, when they are nonlocally coupled in networks. In each domain the oscillators synchronize, sequential domains follow different modes of synchronization and the border elements between two consecutive domains form the asynchronous domains. We investigate the influence of the frequency coupling constant and of the coupling range on the chimera morphology and we show that the chimera multiplicity decreases as the coupling range increases. The frequency spectrum is calculated in the coherent and incoherent domains of this model. In the coherent domains single frequencies ($\omega _l$ or $\omega _h$) are observed, while in the incoherent domains both $\omega _l$ and $\omega _h$ as well as their superpositions appear. This mechanism of creating domains of alternating frequencies offers a reasonable generic scenario for chimera state formation.