☆ 4.5 Article

Stability and multistability of synchronization in networks of coupled phase oscillators

CHINESE PHYSICS B (2023)

相关参考文献

注意：仅列出部分参考文献，下载原文获取全部文献信息。

Article Physics, Multidisciplinary

Synchronization-desynchronization transitions in networks of circle maps with sinusoidal coupling

Yun Zhai et al.

Summary: This paper investigates the synchronization dynamics of networks composed of coupled circle maps as the discrete version of the Kuramoto model. It is found that discreteness can induce interesting synchronization behaviors, including multiple synchronization and desynchronization transitions of both phases and frequencies. The mechanisms of these transitions are interpreted using the mean-field approach, revealing collective bifurcation cascades for coupled circle-map oscillators.

CHINESE PHYSICS B (2023)

添加到收藏夹

Review Physics, Multidisciplinary

Collective nonlinear dynamics and self-organization in decentralized power grids

Dirk Witthaut et al.

Summary: This article reviews the mathematical modeling methods of collective dynamical phenomena in power grid networks, including theories from nonlinear dynamics, stochastic processes, and statistical physics. It introduces power system models and focuses on various collective dynamical phenomena.

REVIEWS OF MODERN PHYSICS (2022)

添加到收藏夹

Article Mathematics, Applied

Stability of twisted states on lattices of Kuramoto oscillators

Monica Goebel et al.

Summary: Real-world systems of coupled oscillators can exhibit spontaneous synchronization and other complex behaviors. The interplay between network topology and emergent dynamics is a rich area of investigation. This study focuses on stability of twisted states in lattices of coupled Kuramoto oscillators, obtaining novel estimates and accurate numerical tests using the Jacobian matrix. The results have potential applications in higher dimensional systems beyond 2D square lattices.

CHAOS (2021)

添加到收藏夹

Article Mathematics, Applied

Modeling the network dynamics of pulse-coupled neurons

Sarthak Chandra et al.

CHAOS (2017)

添加到收藏夹

Review Physics, Multidisciplinary

Explosive transitions in complex networks' structure and dynamics: Percolation and synchronization

S. Boccaletti et al.

PHYSICS REPORTS-REVIEW SECTION OF PHYSICS LETTERS (2016)

添加到收藏夹

Review Physics, Multidisciplinary

The Kuramoto model in complex networks

Francisco A. Rodrigues et al.

PHYSICS REPORTS-REVIEW SECTION OF PHYSICS LETTERS (2016)

添加到收藏夹

Article Physics, Multidisciplinary

Synchronization of Kuramoto oscillators in small-world networks

Yaofeng Zhang et al.

PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS (2014)

添加到收藏夹

Article Mathematics, Applied

Multistability of twisted states in non-locally coupled Kuramoto-type models

Taras Girnyk et al.

CHAOS (2012)

添加到收藏夹

Article Mathematics, Applied

Long time evolution of phase oscillator systems

Edward Ott et al.

CHAOS (2009)

添加到收藏夹

Article Mathematics, Applied

Identical phase oscillators with global sinusoidal coupling evolve by Mobius group action

Seth A. Marvel et al.

CHAOS (2009)

添加到收藏夹

Article Mathematics, Applied

Splay States in a Ring of Coupled Oscillators: From Local to Global Coupling

Wei Zou et al.

SIAM JOURNAL ON APPLIED DYNAMICAL SYSTEMS (2009)

添加到收藏夹

Article Mathematics, Applied

Low dimensional behavior of large systems of globally coupled oscillators

Edward Ott et al.

CHAOS (2008)

添加到收藏夹

Review Physics, Multidisciplinary

Synchronization in complex networks

Alex Arenas et al.

PHYSICS REPORTS-REVIEW SECTION OF PHYSICS LETTERS (2008)

添加到收藏夹

Article Mathematics, Applied

The size of the sync basin

DA Wiley et al.

CHAOS (2006)

添加到收藏夹

Review Physics, Multidisciplinary

Complex networks: Structure and dynamics

S. Boccaletti et al.

PHYSICS REPORTS-REVIEW SECTION OF PHYSICS LETTERS (2006)

添加到收藏夹

Review Physics, Multidisciplinary

The Kuramoto model: A simple paradigm for synchronization phenomena

JA Acebron et al.

REVIEWS OF MODERN PHYSICS (2005)

添加到收藏夹

Article Multidisciplinary Sciences

Emerging coherence in a population of chemical oscillators

IZ Kiss et al.

SCIENCE (2002)

添加到收藏夹

Article Mathematics, Interdisciplinary Applications

Complex networks: Topology, dynamics and synchronization

XF Wang

INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS (2002)

添加到收藏夹

Article Mathematics, Interdisciplinary Applications

Phase synchronizations: Transitions from high- to low-dimensional tori through chaos

BB Hu et al.

INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS (2000)

添加到收藏夹

Article Physics, Fluids & Plasmas

Collective phase slips and phase synchronizations in coupled oscillator systems

ZG Zheng et al.

PHYSICAL REVIEW E (2000)

添加到收藏夹

© Peeref 2019-2024. All rights reserved.