Stasis in heterogeneous networks of coupled oscillators: discontinuous transition with hysteresis

IF 2.6 Q1 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS
Samir Sahoo, A. Prasad, R. Ramaswamy
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引用次数: 0

Abstract

We consider a heterogeneous ensemble of dynamical systems in R4 that individually are either attracted to fixed points (and are termed inactive) or to limit cycles (in which case they are termed active). These distinct states are separated by bifurcations that are controlled by a single parameter. Upon coupling them globally, we find a discontinuous transition to global inactivity (or stasis) when the proportion of inactive components in the ensemble exceeds a threshold: there is a first–order phase transition from a globally oscillatory state to global oscillation death. There is hysteresis associated with these phase transitions. Numerical results for a representative system are supported by analysis using a system-reduction technique and different dynamical regimes can be rationalised through the corresponding bifurcation diagrams of the reduced set of equations.
耦合振荡器异质网络的停滞:具有迟滞的不连续跃迁
我们考虑R4中的动力学系统的异质系综,它们分别被吸引到不动点(并被称为不活跃)或极限环(在这种情况下,它们被称为活跃)。这些不同的状态通过由单个参数控制的分叉来分离。在对它们进行全局耦合时,当系综中非活动分量的比例超过阈值时,我们发现了向全局非活动(或停滞)的不连续转变:存在从全局振荡状态到全局振荡死亡的一阶相变。存在与这些相变相关的滞后现象。使用系统归约技术的分析支持了具有代表性的系统的数值结果,并且可以通过方程组的相应分岔图来合理化不同的动力学状态。
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来源期刊
Journal of Physics Complexity
Journal of Physics Complexity Computer Science-Information Systems
CiteScore
4.30
自引率
11.10%
发文量
45
审稿时长
14 weeks
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