A model of many symmetrically and locally coupled chaotic oscillators is studied.

These are used to quantify the behavior of numerical examples of coupled chaotic attractors.

We consider the evolution of the unstable periodic orbit structure of coupled chaotic systems.

We study synchronization behavior in networks of coupled chaotic oscillators with heterogeneous connection degrees.

The dynamic behavior of coupled chaotic oscillators is investigated.

The effects of noise on phase synchronization (PS) of coupled chaotic oscillators are explored.

Dynamic behavior of coupled chaotic oscillators is investigated.

The effect of noise on phase synchronization in small sets and larger populations of weakly coupled chaotic oscillators is explored.

Finally, an application to a network composed of coupled chaotic Rössler systems is provided for further validation of the new method.

We also analyze how the synchronization effect can influence the rate of mixing in a system of two coupled chaotic oscillators.

We study phase synchronization (PS) of coupled chaotic oscillators as a result of an interplay between local coupling and global noise.