Title : ( Stability and bifurcation analysis in the delay-coupled nonlinear oscillators )
Authors: zohreh dadi , Zahra Afsharnejad , Naser Pariz ,Abstract
This paper investigates the dynamical behavior of two oscillators with nonlinearity terms, which are coupled with finite delay parameters. Each oscillator is a general class of second-order nonlinear delay-differential equations. The system of delay differential equations is analyzed by reducing the delay equations to a system of ordinary differential equations on a finite-dimensional center manifold, the corresponding to an infinite-dimensional phase space. In addition, the characteristic equation for the linear stability of the trivial equilibrium is completely analyzed and the stability region is illustrated in the parameters space. Our analysis reveals necessary coefficients of the reduced vector field on the center manifold for studying the bifurcations of the trivial equilibrium such as transcritical, pitchfork, and Hopf bifurcation. Finally, we consider the delay-coupled van der Pol equations.
Keywords
Delay differential equations · Stability · Center manifold · Hopf bifurcation · Transcritical bifurcation · Pitchfork bifurcation@article{paperid:1032143,
author = {Dadi, Zohreh and Afsharnejad, Zahra and Pariz, Naser},
title = {Stability and bifurcation analysis in the delay-coupled nonlinear oscillators},
journal = {Nonlinear Dynamics},
year = {2012},
volume = {70},
number = {1},
month = {November},
issn = {0924-090X},
pages = {155--169},
numpages = {14},
keywords = {Delay differential equations · Stability ·
Center manifold · Hopf bifurcation · Transcritical
bifurcation · Pitchfork bifurcation},
}
%0 Journal Article
%T Stability and bifurcation analysis in the delay-coupled nonlinear oscillators
%A Dadi, Zohreh
%A Afsharnejad, Zahra
%A Pariz, Naser
%J Nonlinear Dynamics
%@ 0924-090X
%D 2012