Collective behavior of coupled nonuniform stochastic oscillators

Assis, Vladimir R. V.; Copelli, Mauro

doi:10.1016/j.physa.2011.10.012

Cited by 10 publications

(7 citation statements)

References 36 publications

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“…Discrete stochastic models for synchronization phenomena have been increasing in popularity as a simple paradigm of synchronization [7][8][9][10][11][12][13][14][15][16][17][18][19][20][21][22]. Of course, this simplicity is related precisely to the relative ease of dealing with only a few states.…”

Section: Discussionmentioning

confidence: 99%

“…For instance, over the past decade coupled maps have attracted a great deal of attention [2,6]. Recently, arrays of coupled stochastic units each with a discrete set of states but, in contrast with maps, with continuous time have increased in popularity as a simpler paradigm for synchronization [7][8][9][10][11][12][13][14][15][16][17][18][19][20][21][22]. Even though these discrete-state oscillator models may be motivated by dis-crete processes (for example, protein degradation [23][24][25]), it has been claimed that they can also be used to model a coarse-grained phase space of continuous noisy oscillators.…”

Section: Introductionmentioning

confidence: 99%

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Synchronization of coupled noisy oscillators: Coarse graining from continuous to discrete phases

et al. 2016

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The theoretical description of synchronization phenomena often relies on coupled units of continuous time noisy Markov chains with a small number of states in each unit. It is frequently assumed, either explicitly or implicitly, that coupled discrete-state noisy Markov units can be used to model mathematically more complex coupled noisy continuous phase oscillators. In this work we explore conditions that justify this assumption by coarse-graining continuous phase units. In particular, we determine the minimum number of states necessary to justify this correspondence for Kuramoto-like oscillators.

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Section: Discussionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Synchronization of coupled noisy oscillators: Coarse graining from continuous to discrete phases

et al. 2016

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“…[6]. Our own work on coupled three-state stochastic oscillators [7][8][9][10] has been extended in interesting ways by Assis et al [11,12], including the discovery of a symmetry-breaking transition to a steady state that has no counterpart in equilibrium statistical mechanics.…”

Section: Introductionmentioning

confidence: 97%

Globally coupled stochastic two-state oscillators: Fluctuations due to finite numbers

et al. 2014

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Infinite arrays of coupled two-state stochastic oscillators exhibit well-defined steady states. We study the fluctuations that occur when the number N of oscillators in the array is finite. We choose a particular form of global coupling that in the infinite array leads to a pitchfork bifurcation from a monostable to a bistable steady state, the latter with two equally probable stationary states. The control parameter for this bifurcation is the coupling strength. In finite arrays these states become metastable: The fluctuations lead to distributions around the most probable states, with one maximum in the monostable regime and two maxima in the bistable regime. In the latter regime, the fluctuations lead to transitions between the two peak regions of the distribution. Also, we find that the fluctuations break the symmetry in the bimodal regime, that is, one metastable state becomes more probable than the other, increasingly so with increasing array size. To arrive at these results, we start from microscopic dynamical evolution equations from which we derive a Langevin equation that exhibits an interesting multiplicative noise structure. We also present a master equation description of the dynamics. Both of these equations lead to the same Fokker-Planck equation, the master equation via a 1/N expansion and the Langevin equation via standard methods of Itô calculus for multiplicative noise. From the Fokker-Planck equation we obtain an effective potential that reflects the transition from the monomodal to the bimodal distribution as a function of a control parameter. We present a variety of numerical and analytic results that illustrate the strong effects of the fluctuations. We also show that the limits N → ∞ and t → ∞ (t is the time) do not commute. In fact, the two orders of implementation lead to drastically different results.

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“…By "uniform global coupling" we mean all-to-all coupling all of equal strength. In a particular rendition of the model, further increasing the cou-pling strength leads to a slowing down of the state-tostate transitions until the oscillatory global state is lost altogether via an infinite-period bifurcation [24,25], and the system reaches a static stationary state in which most of the units are locked and static in the same state. Note that with uniform global coupling we do not introduce the notion of dimensionality, nor do we need to address any "spatial" questions.…”

Section: Introductionmentioning

confidence: 99%

Arrays of two-state stochastic oscillators: Roles of tail and range of interactions

et al. 2017

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We study the role of the tail and range of interaction in a spatially structured population of twostate on-off units governed by Markovian transition rates. The coupling among the oscillators is evidenced by the dependence of the transition rates of each unit on the states of the units to which it is coupled. Tuning the tail or range of the interactions, we observe a transition from an ordered global state (long range interactions) to a disordered one (short range interactions). Depending on the interaction kernel, the transition may be smooth (second order) or abrupt (first order). We analyze the transient, which may present different routes to the steady state with vastly different time scales.

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Collective behavior of coupled nonuniform stochastic oscillators

Cited by 10 publications

References 36 publications

Synchronization of coupled noisy oscillators: Coarse graining from continuous to discrete phases

Synchronization of coupled noisy oscillators: Coarse graining from continuous to discrete phases

Globally coupled stochastic two-state oscillators: Fluctuations due to finite numbers

Arrays of two-state stochastic oscillators: Roles of tail and range of interactions

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