Eur. Phys. J. B 70, 535-541 (2009)
https://doi.org/10.1140/epjb/e2009-00257-5

Synchronization, stickiness effects and intermittent oscillations in coupled nonlinear stochastic networks

¹ Institute of Physical Chemistry, National Center for Scientific Research “Demokritos”, 15310 Athens, Greece
² Department of Mathematical, Physical and Computational Science, Faculty of Engineering, Aristotle University of Thessaloniki, 54124 Thessaloniki, Greece

Corresponding author: ^a aprovata@limnos.chem.demokritos.gr

Received: 13 January 2009
Revised: 19 May 2009
Published online: 21 July 2009

Abstract

Long distance reactive and diffusive coupling is introduced in a spatially extended nonlinear stochastic network of interacting particles. The network serves as a substrate for Lotka-Volterra dynamics with 3rd order nonlinearities. If the network includes only local nearest neighbour interactions, the system organizes into a number of local asynchronous oscillators. It is shown that (a) Introduction of all-to-all coupling in the network leads the system into global, center-type, conservative oscillations as dictated by the mean-field dynamics. (b) Introduction of reactive coupling to the network leads the system to intermittent oscillations where the trajectories stick for short times in bounded regions of space, with subsequent jumps between different bounded regions. (c) Introduction of diffusive coupling to the system does not alter the dynamics for small values of the diffusive coupling p _diff, while after a critical value p _diff^c the system synchronizes into a limit cycle with specific frequency, deviating non-trivially from the mean-field center-type behaviour. The frequency of the limit cycle oscillations depends on the reaction rates and on the diffusion coupling. The amplitude σ of the limit cycle depends on the control parameter p _diff.