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Main Authors: Goebel, Monica, Mizuhara, Matthew S, Stepanoff, Sofia
Format: Preprint
Published: 2021
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Online Access:https://arxiv.org/abs/2106.07119
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author Goebel, Monica
Mizuhara, Matthew S
Stepanoff, Sofia
author_facet Goebel, Monica
Mizuhara, Matthew S
Stepanoff, Sofia
contents Real world systems comprised of coupled oscillators have the ability to exhibit spontaneous synchronization and other complex behaviors. The interplay between the underlying network topology and the emergent dynamics remains a rich area of investigation for both theory and experiment. In this work we study lattices of coupled Kuramoto oscillators with non-local interactions. Our focus is on the stability of twisted states. These are equilibrium solutions with constant phase shifts between oscillators resulting in spatially linear profiles. Linear stability analysis follows from studying the quadratic form associated with the Jacobian matrix. Novel estimates on both stable and unstable regimes of twisted states are obtained in several cases. Moreover, exploiting the "almost circulant" nature of the Jacobian obtains a surprisingly accurate numerical test for stability. While our focus is on 2D square lattices, we show how our results can be extended to higher dimensions.
format Preprint
id arxiv_https___arxiv_org_abs_2106_07119
institution arXiv
publishDate 2021
record_format arxiv
spellingShingle Stability of twisted states on lattices of Kuramoto oscillators
Goebel, Monica
Mizuhara, Matthew S
Stepanoff, Sofia
Pattern Formation and Solitons
Real world systems comprised of coupled oscillators have the ability to exhibit spontaneous synchronization and other complex behaviors. The interplay between the underlying network topology and the emergent dynamics remains a rich area of investigation for both theory and experiment. In this work we study lattices of coupled Kuramoto oscillators with non-local interactions. Our focus is on the stability of twisted states. These are equilibrium solutions with constant phase shifts between oscillators resulting in spatially linear profiles. Linear stability analysis follows from studying the quadratic form associated with the Jacobian matrix. Novel estimates on both stable and unstable regimes of twisted states are obtained in several cases. Moreover, exploiting the "almost circulant" nature of the Jacobian obtains a surprisingly accurate numerical test for stability. While our focus is on 2D square lattices, we show how our results can be extended to higher dimensions.
title Stability of twisted states on lattices of Kuramoto oscillators
topic Pattern Formation and Solitons
url https://arxiv.org/abs/2106.07119