Oscillator networks display intricate synchronization patterns. Determining their stability typically requires incorporating the symmetries of the network coupling. Going beyond analyses that appeal only to a network's automorphism group, we explore synchronization patterns that emerge from the phase-shift invariance of the dynamical equations and symmetries in the nodes. We show that these nonstructural symmetries simplify stability calculations. We analyze a ring-network of phase-amplitude oscillators that exhibits a "decoupled" state in which physically-coupled nodes appear to act independently due to emergent cancellations in the equations of dynamical evolution. We establish that this state can be linearly stable for a ring of phase-am...
Piecewise linear (PWL) modelling has many useful applications in the applied sciences. Although the ...
Dynamical processes in many engineered and living systems take place on complex networks of discrete...
This paper clarifies the relation between synchronization and graph topology. Applying the Connectio...
We study networks with coupled phase and amplitude dynamics. In particular, we investigate a ring of...
We present a framework for analysing arbitrary networks of identical dissipative oscillators assumin...
We analyze the interplay of synchronization and structure evolution in an evolving network of phase ...
For coupled oscillator networks with Laplacian coupling the master stability function (MSF) has prov...
Synchronization is crucial for the correct functionality of many natural and man-made complex system...
The incipience of synchrony in a diverse population of phase oscillators with non-identical interact...
We fully describe the mechanisms underlying synchronization in starlike networks of phase oscillator...
The study of nonlinear oscillations is important in a variety of physical and biological contexts (e...
Abstract — This paper studies networks of identical phase-coupled oscillators with arbitrary underly...
Synchronization is of central importance in power distribution, telecommunication, neuronal and bio...
A system consisting of interconnected networks, or a network of networks (NoN), appears diversely in...
We study networks of coupled phase oscillators and show that network architecture can force relation...
Piecewise linear (PWL) modelling has many useful applications in the applied sciences. Although the ...
Dynamical processes in many engineered and living systems take place on complex networks of discrete...
This paper clarifies the relation between synchronization and graph topology. Applying the Connectio...
We study networks with coupled phase and amplitude dynamics. In particular, we investigate a ring of...
We present a framework for analysing arbitrary networks of identical dissipative oscillators assumin...
We analyze the interplay of synchronization and structure evolution in an evolving network of phase ...
For coupled oscillator networks with Laplacian coupling the master stability function (MSF) has prov...
Synchronization is crucial for the correct functionality of many natural and man-made complex system...
The incipience of synchrony in a diverse population of phase oscillators with non-identical interact...
We fully describe the mechanisms underlying synchronization in starlike networks of phase oscillator...
The study of nonlinear oscillations is important in a variety of physical and biological contexts (e...
Abstract — This paper studies networks of identical phase-coupled oscillators with arbitrary underly...
Synchronization is of central importance in power distribution, telecommunication, neuronal and bio...
A system consisting of interconnected networks, or a network of networks (NoN), appears diversely in...
We study networks of coupled phase oscillators and show that network architecture can force relation...
Piecewise linear (PWL) modelling has many useful applications in the applied sciences. Although the ...
Dynamical processes in many engineered and living systems take place on complex networks of discrete...
This paper clarifies the relation between synchronization and graph topology. Applying the Connectio...