Identical phase oscillator networks: bifurcations, symmetry and reversibility for generalized coupling
For a system of coupled identical phase oscillators with full permutation symmetry, any broken symmetries in dynamical behaviour must come from spontaneous symmetry breaking, i.e. from the nonlinear dynamics of the system. The dynamics of phase differences for such a system depends only on the coupl...
Main Authors: | Ashwin, P, Bick, C, Burylko, O |
---|---|
Formato: | Journal article |
Publicado em: |
Frontiers Media
2016
|
Registos relacionados
-
Global Bifurcations Organizing Weak Chimeras in Three Symmetrically Coupled Kuramoto Oscillators with Inertia
Por: Ashwin, P, et al.
Publicado em: (2025) -
Chaos in generically coupled phase oscillator networks with nonpairwise interactions.
Por: Bick, C, et al.
Publicado em: (2016) -
Hopf bifurcations of twisted states in phase oscillators rings with nonpairwise higher-order interactions
Por: Bick, C, et al.
Publicado em: (2024) -
Hopf bifurcations of twisted states in phase oscillators rings with nonpairwise higher-order interactions
Por: Christian Bick, et al.
Publicado em: (2024-01-01) -
Bifurcation Analysis and Spatiotemporal Patterns of Nonlinear Oscillations in a Ring Lattice of Identical Neurons with Delayed Coupling
Por: Jiao Jiang, et al.
Publicado em: (2014-01-01)