Phase synchronization in small-world networks of chaotic oscillators

We introduce an adaptation algorithm by which an ensemble of coupled oscillators with attractive and repulsive interactions is induced to adopt a prescribed synchronized state. While the performance of adaptation is controlled by measuring a macroscopic quantity, which characterizes the achieved deg

We study the synchronization of coupled phase oscillators in random complex networks. The topology of the networks is assumed to be vary over time. Here we mainly study the onset of global phase synchronization when the topology switches rapidly over time. We find that the results are, to some exten

By making use of a parametric adaptive control, it is possible to synchronize, desynchronize or resynchronize a network of globally coupled chaotic oscillators in the presence of large noise. The method, based on the Kalman filter, is applied to logistic and H6non map lattices. This method can be re

The collective behavior of lattices of chaotic-bursting neurons electrically coupled with nearest neighbor connections has been studied recently to some extent [1]. Some interesting results have been reported, for instance, spatio-temporal patterns consisting of clusters of synchronized bursts and b

It is well known that non-periodic behavior is one of the most puzzling characteristics of chaotic oscillators. So far chaotic dynamical systems have been investigated in Euclidean spaces. In this paper, the concept of non-autonomous dynamical systems and that of Hausdor! phase spaces are proposed.