© 2019 Author(s). In a complex system, the interactions between individual agents often lead to emergent collective behavior such as spontaneous synchronization, swarming, and pattern formation. Beyond the intrinsic properties of the agents, the topology of the network of interactions can have a dramatic influence over the dynamics. In many studies, researchers start with a specific model for both the intrinsic dynamics of each agent and the interaction network and attempt to learn about the dynamics of the model. Here, we consider the inverse problem: given data from a system, can one learn about the model and the underlying network? We investigate arbitrary networks of coupled phase oscillators that can exhibit both synchronous and asynch...
Reconstructing network connectivity from the collective dynamics of a system typically requires acce...
Abstract Power grids, transportation systems, neural circuits and gene regulatory networks are just ...
Many real-world systems are often regarded as weakly coupled limit-cycle oscillators, in which each ...
In a complex system, the interactions between individual agents often lead to emergent collective be...
Networks of interacting oscillators abound in nature, and one of the prevailing challenges in scienc...
In recent years, an abundance of studies in complex systems research have focused on deciphering the...
We review an approach for reconstructing oscillatory networks’ undirected and directed connectivity ...
Extracting complex interactions (i.e., dynamic topologies) has been an essential, but difficult, ste...
A system composed by interacting dynamical elements can be represented by a network, where the nodes...
AbstractWe provide the topological structure of a series of N=28 Rössler chaotic oscillators diffusi...
Abstract — The emergence of synchronization in a network of coupled oscillators is a pervasive topic...
Inferring the interactions between coupled oscillators is a significant open problem in complexity s...
We provide the topological structure of a series of N=28 Rössler chaotic oscillators diffusively cou...
Abstract — The emergence of synchronization in a network of coupled oscillators is a pervasive topic...
PublishedJournal ArticleThe tools of weakly coupled phase oscillator theory have had a profound impa...
Reconstructing network connectivity from the collective dynamics of a system typically requires acce...
Abstract Power grids, transportation systems, neural circuits and gene regulatory networks are just ...
Many real-world systems are often regarded as weakly coupled limit-cycle oscillators, in which each ...
In a complex system, the interactions between individual agents often lead to emergent collective be...
Networks of interacting oscillators abound in nature, and one of the prevailing challenges in scienc...
In recent years, an abundance of studies in complex systems research have focused on deciphering the...
We review an approach for reconstructing oscillatory networks’ undirected and directed connectivity ...
Extracting complex interactions (i.e., dynamic topologies) has been an essential, but difficult, ste...
A system composed by interacting dynamical elements can be represented by a network, where the nodes...
AbstractWe provide the topological structure of a series of N=28 Rössler chaotic oscillators diffusi...
Abstract — The emergence of synchronization in a network of coupled oscillators is a pervasive topic...
Inferring the interactions between coupled oscillators is a significant open problem in complexity s...
We provide the topological structure of a series of N=28 Rössler chaotic oscillators diffusively cou...
Abstract — The emergence of synchronization in a network of coupled oscillators is a pervasive topic...
PublishedJournal ArticleThe tools of weakly coupled phase oscillator theory have had a profound impa...
Reconstructing network connectivity from the collective dynamics of a system typically requires acce...
Abstract Power grids, transportation systems, neural circuits and gene regulatory networks are just ...
Many real-world systems are often regarded as weakly coupled limit-cycle oscillators, in which each ...