The formalism of complex networks is extensively employed to describe the dynamics of interacting agents in several applications. The features of the connections among the nodes in a network are not always provided beforehand, hence the problem of appropriately inferring them often arises. Here, we present a method to reconstruct directed and weighted topologies of networks of heterogeneous nonlinear oscillators. We illustrate the theory on a set of representative examples.
Reconstructing the structure of directed and weighted networks of nonlinear oscillators / Alderisio, Francesco; Fiore, Gianfranco; DI BERNARDO, Mario. - In: PHYSICAL REVIEW. E. - ISSN 2470-0045. - 95:4(2017), p. 042302. [10.1103/PhysRevE.95.042302]
Reconstructing the structure of directed and weighted networks of nonlinear oscillators
FIORE, GIANFRANCO;DI BERNARDO, MARIO
2017
Abstract
The formalism of complex networks is extensively employed to describe the dynamics of interacting agents in several applications. The features of the connections among the nodes in a network are not always provided beforehand, hence the problem of appropriately inferring them often arises. Here, we present a method to reconstruct directed and weighted topologies of networks of heterogeneous nonlinear oscillators. We illustrate the theory on a set of representative examples.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
