Synchronization hypothesis in the Winfree model
Abstract
We consider oscillators coupled by a mean field as in the Winfree model. The model is governed by two parameters: the coupling strength and the spectrum width of the frequencies of each oscillator. In the uncoupled regime, , each oscillator possesses its own natural frequency, and the difference between the phases of any two oscillators grows linearly in time. We say that oscillators are synchronized if the difference between any two phases is uniformly bounded in time. We identify a new hypothesis for the existence of synchronization. The domain in of synchronization contains coupling values that are both weak and strong. Moreover the domain is independent of the number of oscillators and the distribution of the frequencies. We give a numerical counter-example which shows that this hypothesis is necessary for the existence of synchronization.
Keywords
Cite
@article{arxiv.1507.06061,
title = {Synchronization hypothesis in the Winfree model},
author = {W Oukil and A Kessi and Ph Thieullen},
journal= {arXiv preprint arXiv:1507.06061},
year = {2016}
}