We investigate the effect of coupling delays on the synchronization properties of several network motifs. In particular, we analyze the synchronization patterns of unidirectionally coupled rings, bidirectionally coupled rings, and open chains of Kuramoto oscillators. Our approach includes an analytical and semianalytical study of the existence and stability of different in-phase and out-of-phase periodic solutions, complemented by numerical simulations. The delay is found to act differently on networks possessing different symmetries. While for the unidirectionally coupled ring the coupling delay is mainly observed to induce multistability, its effect on bidirectionally coupled rings is to enhance the most symmetric solution. We also study ...
<p>I investigate a population of N limit-cycle oscillators coupled on a network structure with time ...
Abstract. We derive rigorous conditions for the synchronization of all-optically coupled lasers. In ...
Coupling delays may cause drastic changes in the dynamics of oscillatory networks. In the present pa...
We investigate the effect of coupling delays on the synchronization properties of several network mo...
We investigate the effect of coupling delays on the synchronization properties of several network mo...
We investigate frequency synchronization and phase agreement in networks of non-identical Kuramoto o...
The symmetry in a network of oscillators determines the spatiotemporal patterns of activity that can...
We study the influence of delayed coupling on synchronization in neural network motifs. Numerical si...
Synchronization is crucial for the correct functionality of many natural and man-made complex system...
We describe the appearance and stability of spatiotemporal periodic patterns (rotating waves) in uni...
The phenomenon of enhancement of synchronization due to time delay is investigated in an arbitrary d...
We study the synchronization behavior of Stuart-Landau oscillators coupled with delay, using analyti...
Kuramoto oscillators have been proposed earlier as a model for interacting systems that exhibit sync...
We consider the synchronization problem of an arbitrary number of coupled nonlinear oscillators with...
<p>I investigate a population of N limit-cycle oscillators coupled on a network structure with time ...
Abstract. We derive rigorous conditions for the synchronization of all-optically coupled lasers. In ...
Coupling delays may cause drastic changes in the dynamics of oscillatory networks. In the present pa...
We investigate the effect of coupling delays on the synchronization properties of several network mo...
We investigate the effect of coupling delays on the synchronization properties of several network mo...
We investigate frequency synchronization and phase agreement in networks of non-identical Kuramoto o...
The symmetry in a network of oscillators determines the spatiotemporal patterns of activity that can...
We study the influence of delayed coupling on synchronization in neural network motifs. Numerical si...
Synchronization is crucial for the correct functionality of many natural and man-made complex system...
We describe the appearance and stability of spatiotemporal periodic patterns (rotating waves) in uni...
The phenomenon of enhancement of synchronization due to time delay is investigated in an arbitrary d...
We study the synchronization behavior of Stuart-Landau oscillators coupled with delay, using analyti...
Kuramoto oscillators have been proposed earlier as a model for interacting systems that exhibit sync...
We consider the synchronization problem of an arbitrary number of coupled nonlinear oscillators with...
<p>I investigate a population of N limit-cycle oscillators coupled on a network structure with time ...
Abstract. We derive rigorous conditions for the synchronization of all-optically coupled lasers. In ...
Coupling delays may cause drastic changes in the dynamics of oscillatory networks. In the present pa...