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Geometrical properties of coupled oscillators at synchronization

✍ Scribed by Hassan F. El-Nashar; Hilda A. Cerdeira

Publisher
Elsevier Science
Year
2011
Tongue
English
Weight
391 KB
Volume
16
Category
Article
ISSN
1007-5704

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✦ Synopsis

We study the synchronization of N nearest neighbors coupled oscillators in a ring. We derive an analytic form for the phase difference among neighboring oscillators which shows the dependency on the periodic boundary conditions. At synchronization, we find two distinct quantities which characterize four of the oscillators, two pairs of nearest neighbors, which are at the border of the clusters before total synchronization occurs. These oscillators are responsible for the saddle node bifurcation, of which only two of them have a phase-lock of phase difference equals Β± p/2. Using these properties we build a technique based on geometric properties and numerical observations to arrive to an exact analytic expression for the coupling strength at full synchronization and determine the two oscillators that have a phase-lock condition of Β± p/2.

πŸ“œ SIMILAR VOLUMES

Synchronization in lattices of coupled o
Synchronization in lattices of coupled oscillators
✍ V.S. Afraimovich; S.-N. Chow; J.K. Hale πŸ“‚ Article πŸ“… 1997 πŸ› Elsevier Science 🌐 English βš– 444 KB

We consider coupled nonlinear oscillators with external periodic forces and the Dirichlet boundary conditions. We prove that synchronization occurs provided that the coupling is dissipative and the coupling coefficients are sufficiently large. The synchronization here is of an obvious type -the size