We present a detailed study of the effect of time delay on the collective dynamics of coupled limit cycle oscillators at Hopf bifurcation. For a simple model consisting of just two oscillators with a time delayed coupling, the bifurcation diagram obtained by numerical and analytical solutions shows significant changes in the stability boundaries of the amplitude death, phase locked and incoherent regions. A novel result is the occurrence of amplitude death even in the absence of a frequency mismatch between the two oscillators. Similar results are obtained for an array of N oscillators with a delayed mean field coupling and the regions of such amplitude death in the parameter space of the coupling strength and time delay are quantified. Som...
Copyright © 2013 Julio Rodriguez et al.This is an open access article distributed under the Creative...
We consider the behavior of Stuart-Landau oscillators as generic limit-cycle oscillators when they a...
The coexistence of two stable limit cycles exhibiting different periods is examined for a nonlinear ...
We present a detailed study of the effect of time delay on the collective dynamics of coupled limit ...
We present a detailed study of the effect of time delay on the collective dynamics of coupled limit ...
We study the effects of time delayed linear and nonlinear feedbacks on the dynamics of a single Hopf...
Coupled limit cycle oscillators with instantaneous mutual coupling offer a useful but idealized math...
We investigate the dynamical behavior of two limit cycle oscillators that interact with each other v...
To complement and support our theoretical and numerical investigations of the e®ects of time delay o...
In this paper, the normal form and central manifold theories are used to discuss the influence of tw...
We present a detailed bifurcation analysis of desynchronization transitions in a system of two coupl...
This paper studies the effects of coupling with distributed delay on the suppression of os...
This paper studies the effects of distributed-delay coupling on the dynamics in a system of non-iden...
In this paper, we study a system of three coupled van der Pol oscillators that are coupled through t...
We study coupled dynamical systems wherein the influence of one system on the other is cumulative: c...
Copyright © 2013 Julio Rodriguez et al.This is an open access article distributed under the Creative...
We consider the behavior of Stuart-Landau oscillators as generic limit-cycle oscillators when they a...
The coexistence of two stable limit cycles exhibiting different periods is examined for a nonlinear ...
We present a detailed study of the effect of time delay on the collective dynamics of coupled limit ...
We present a detailed study of the effect of time delay on the collective dynamics of coupled limit ...
We study the effects of time delayed linear and nonlinear feedbacks on the dynamics of a single Hopf...
Coupled limit cycle oscillators with instantaneous mutual coupling offer a useful but idealized math...
We investigate the dynamical behavior of two limit cycle oscillators that interact with each other v...
To complement and support our theoretical and numerical investigations of the e®ects of time delay o...
In this paper, the normal form and central manifold theories are used to discuss the influence of tw...
We present a detailed bifurcation analysis of desynchronization transitions in a system of two coupl...
This paper studies the effects of coupling with distributed delay on the suppression of os...
This paper studies the effects of distributed-delay coupling on the dynamics in a system of non-iden...
In this paper, we study a system of three coupled van der Pol oscillators that are coupled through t...
We study coupled dynamical systems wherein the influence of one system on the other is cumulative: c...
Copyright © 2013 Julio Rodriguez et al.This is an open access article distributed under the Creative...
We consider the behavior of Stuart-Landau oscillators as generic limit-cycle oscillators when they a...
The coexistence of two stable limit cycles exhibiting different periods is examined for a nonlinear ...