TY - JOUR
T1 - A new class of chimeras in locally coupled oscillators with small-amplitude, high-frequency asynchrony and large-amplitude, low-frequency synchrony
AU - Kaper, Tasso J.
AU - Vo, Theodore
N1 - Funding Information:
The authors thank Karen Corbett for useful conversations and support with MASSIVE. We also thank Naziru Awal, Irv Epstein, Ryan Goh, Christian Kuehn, Jonathan Touboul, Gene Wayne, and Martin Wechselberger for useful comments and questions. We thank two anonymous referees for their many insightful comments. The research of T.V. was partially supported by the National Science Foundation (NSF)-DMS (No. 1853342). The research of T.J.K. was partially supported by the NSF-DMS (No. 1616064). This work was supported by the MASSIVE HPC facility (www.massive.org.au).
Publisher Copyright:
© 2021 Author(s).
PY - 2021/12
Y1 - 2021/12
N2 - Chimeras are surprising yet important states in which domains of decoherent (asynchronous) and coherent (synchronous) oscillations co-exist. In this article, we report on the discovery of a new class of chimeras, called mixed-amplitude chimera states, in which the structures, amplitudes, and frequencies of the oscillations differ substantially in the decoherent and coherent regions. These mixed-amplitude chimeras exhibit domains of decoherent small-amplitude oscillations (phase waves) coexisting with domains of stable and coherent large-amplitude or mixed-mode oscillations (MMOs). They are observed in a prototypical bistable partial differential equation with oscillatory dynamics, spatially homogeneous kinetics, and purely local, isotropic diffusion. They are observed in parameter regimes immediately adjacent to regimes in which common large-amplitude solutions exist, such as trigger waves, spatially homogeneous MMOs, and sharp-interface solutions. Also, key singularities, folded nodes, and folded saddles arising commonly in multi-scale, bistable systems play important roles, and these have not previously been studied in systems with chimeras. The discovery of these mixed-amplitude chimeras is an important advance for understanding some processes in neuroscience, pattern formation, and physics, which involve both small-amplitude and large-amplitude oscillations. It may also be of use for understanding some aspects of electroencephalogram recordings from animals that exhibit unihemispheric slow-wave sleep.
AB - Chimeras are surprising yet important states in which domains of decoherent (asynchronous) and coherent (synchronous) oscillations co-exist. In this article, we report on the discovery of a new class of chimeras, called mixed-amplitude chimera states, in which the structures, amplitudes, and frequencies of the oscillations differ substantially in the decoherent and coherent regions. These mixed-amplitude chimeras exhibit domains of decoherent small-amplitude oscillations (phase waves) coexisting with domains of stable and coherent large-amplitude or mixed-mode oscillations (MMOs). They are observed in a prototypical bistable partial differential equation with oscillatory dynamics, spatially homogeneous kinetics, and purely local, isotropic diffusion. They are observed in parameter regimes immediately adjacent to regimes in which common large-amplitude solutions exist, such as trigger waves, spatially homogeneous MMOs, and sharp-interface solutions. Also, key singularities, folded nodes, and folded saddles arising commonly in multi-scale, bistable systems play important roles, and these have not previously been studied in systems with chimeras. The discovery of these mixed-amplitude chimeras is an important advance for understanding some processes in neuroscience, pattern formation, and physics, which involve both small-amplitude and large-amplitude oscillations. It may also be of use for understanding some aspects of electroencephalogram recordings from animals that exhibit unihemispheric slow-wave sleep.
UR - http://www.scopus.com/inward/record.url?scp=85121114629&partnerID=8YFLogxK
U2 - 10.1063/5.0067421
DO - 10.1063/5.0067421
M3 - Article
C2 - 34972325
AN - SCOPUS:85121114629
SN - 1054-1500
VL - 31
JO - Chaos
JF - Chaos
IS - 12
M1 - 123111
ER -