A system composed by interacting dynamical elements can be represented by a network, where the nodes represent the elements that constitute the system, and the links account for their interactions, which arise due to a variety of mechanisms, and which are often unknown. A popular method for inferring the system connectivity (i.e., the set of links among pairs of nodes) is by performing a statistical similarity analysis of the time-series collected from the dynamics of the nodes. Here, by considering two systems of coupled oscillators (Kuramoto phase oscillators and Rössler chaotic electronic oscillators) with known and controllable coupling conditions, we aim at testing the performance of this inference method, by using linear and non linea...
We provide the topological structure of a series of N=28 Rössler chaotic oscillators diffusively cou...
Many real-world systems are often regarded as weakly coupled limit-cycle oscillators, in which each ...
AbstractWe provide the topological structure of a series of N=28 Rössler chaotic oscillators diffusi...
A system composed by interacting dynamical elements can be represented by a network, where the nodes...
Inferring the interactions between coupled oscillators is a significant open problem in complexity s...
In this paper, we present a method that combines information-theoretical and statistical approaches ...
The inference of an underlying network topology from local observations of a complex system composed...
Networks of interacting oscillators abound in nature, and one of the prevailing challenges in scienc...
The synchronization phenomenon is ubiquitous in nature. In ensembles ofcoupled oscillators, explosiv...
We review an approach for reconstructing oscillatory networks’ undirected and directed connectivity ...
In a complex system, the interactions between individual agents often lead to emergent collective be...
The Kuramoto model for an ensemble of coupled oscillators provides a paradigmatic example of nonequi...
A foremost challenge in modern network science is the inverse problem of reconstruction (inference) ...
Extracting useful information from data is a fundamental challenge across disciplines as diverse as ...
We investigate the dynamics of large arrays of coupled phase oscillators driven by random intrinsic ...
We provide the topological structure of a series of N=28 Rössler chaotic oscillators diffusively cou...
Many real-world systems are often regarded as weakly coupled limit-cycle oscillators, in which each ...
AbstractWe provide the topological structure of a series of N=28 Rössler chaotic oscillators diffusi...
A system composed by interacting dynamical elements can be represented by a network, where the nodes...
Inferring the interactions between coupled oscillators is a significant open problem in complexity s...
In this paper, we present a method that combines information-theoretical and statistical approaches ...
The inference of an underlying network topology from local observations of a complex system composed...
Networks of interacting oscillators abound in nature, and one of the prevailing challenges in scienc...
The synchronization phenomenon is ubiquitous in nature. In ensembles ofcoupled oscillators, explosiv...
We review an approach for reconstructing oscillatory networks’ undirected and directed connectivity ...
In a complex system, the interactions between individual agents often lead to emergent collective be...
The Kuramoto model for an ensemble of coupled oscillators provides a paradigmatic example of nonequi...
A foremost challenge in modern network science is the inverse problem of reconstruction (inference) ...
Extracting useful information from data is a fundamental challenge across disciplines as diverse as ...
We investigate the dynamics of large arrays of coupled phase oscillators driven by random intrinsic ...
We provide the topological structure of a series of N=28 Rössler chaotic oscillators diffusively cou...
Many real-world systems are often regarded as weakly coupled limit-cycle oscillators, in which each ...
AbstractWe provide the topological structure of a series of N=28 Rössler chaotic oscillators diffusi...