Titlebook: Delay-Coupled Complex Systems; and Applications to Valentin Flunkert Book 2011 Springer-Verlag Berlin Heidelberg 2011 Complex networks.Con

兇兆

clarify

Limpid

IntroductionDelays are ubiquitous in nature and occur, for instance, in coupled systems, in biological processes, neural systems, or in control problems. Time delays arise in these systems due to finite signal propagation and processing speeds, latency effects or are introduced deliberately via external control loops.

和平主義者

CounterexampleIn this section we will construct a counterexample to the odd-number theorem, i.e., a system with an odd-number orbit, where the orbit can be stabilized by time-delayed feedback control. The counterexample consists of the normal form of a subcritical Hopf bifurcation

Pde5-Inhibitors

Lang Kobayashi Laser EquationsCoupled semiconductor lasers will be the main application of chaos synchronization that we consider. We will therefore now introduce the dynamical laser equations

GROWL

Necessary Conditions for Synchronization of LasersPerfect synchronization is only possible if the SM is invariant. There are other forms of . such as . occurring, for instance, when the systems are non-identical, but we will restrict our analysis to perfect synchronization and a very weak form of generalized synchronization in lasers.

沒有準(zhǔn)備

BubblingThe stability of a synchronized state is determined by the largest transversal Lyapunov exponent (TLE) arising from the particular dynamics in the SM and the variational equation associated with transverse perturbations, as we have discussed in ..

公共汽車

不愛防注射

Allowance