Collective fluctuations in networks of noisy components
Collective dynamics result from interactions among noisy dynamical
components. Examples include heartbeats, circadian rhythms, and
various pattern formations. Because of noise in each component,
collective dynamics inevitably involve fluctuations, which may
crucially affect functioning of the system. However, the relation
between the fluctuations in isolated individual components and those
in collective dynamics is unclear. Here we study a linear dynamical
system of networked components subjected to independent Gaussian noise and analytically show that the connectivity of networks determines the intensity of fluctuations in the collective dynamics. Remarkably, in general directed networks including scale-free networks, the fluctuations decrease more slowly with the system size than the standard law stated by the central limit theorem. They even remain finite for a large system size when global directionality of the network exists. Moreover, such nontrivial behavior appears even in undirected networks when nonlinear dynamical systems are considered. We demonstrate it with a coupled oscillator system.
components. Examples include heartbeats, circadian rhythms, and
various pattern formations. Because of noise in each component,
collective dynamics inevitably involve fluctuations, which may
crucially affect functioning of the system. However, the relation
between the fluctuations in isolated individual components and those
in collective dynamics is unclear. Here we study a linear dynamical
system of networked components subjected to independent Gaussian noise and analytically show that the connectivity of networks determines the intensity of fluctuations in the collective dynamics. Remarkably, in general directed networks including scale-free networks, the fluctuations decrease more slowly with the system size than the standard law stated by the central limit theorem. They even remain finite for a large system size when global directionality of the network exists. Moreover, such nontrivial behavior appears even in undirected networks when nonlinear dynamical systems are considered. We demonstrate it with a coupled oscillator system.
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