In-phase synchronization in complex oscillator networks by adaptive delayed feedback control
Abstract
In-phase synchronization is a special case of synchronous behavior when coupled oscillators have the same phases for any time moments. Such behavior appears naturally for nearly identical coupled limit-cycle oscillators when the coupling strength is greatly above the synchronization threshold. We investigate the general class of nearly identical complex oscillators connected into network in a context of a phase reduction approach. By treating each oscillator as a black-box possessing a single-input single-output, we provide a practical and simply realizable control algorithm to attain the in-phase synchrony of the network. For a general diffusive-type coupling law and any value of a coupling strength (even greatly below the synchronization threshold) the delayed feedback control with a specially adjusted time-delays can provide in-phase synchronization. Such adjustment of the delay times performed in an automatic fashion by the use of an adaptive version of the delayed feedback algorithm when time-delays become time-dependent slowly varying control parameters. Analytical results show that there are many arrangements of the time-delays for the in-phase synchronization, therefore we supplement the algorithm by an additional requirement to choose appropriate set of the time-delays, which minimize power of a control force. Performed numerical validations of the predictions highlights the usefulness of our approach.
Cite
@article{arxiv.1804.04146,
title = {In-phase synchronization in complex oscillator networks by adaptive delayed feedback control},
author = {Viktor Novičenko and Irmantas Ratas},
journal= {arXiv preprint arXiv:1804.04146},
year = {2019}
}
Comments
Small corrections of indexing in Eqs. (26), (27) and (31). Also the value of \beta parameter are corrected