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Noise-induced phase slips, log-periodic oscillations, and the Gumbel distribution
Abstract: When two synchronised phase oscillators are perturbed by weak noise, they display occasional losses of synchrony, called phase slips. The slips can be characterised by their location in phase space and their duration. We show that when properly normalised, their location converges, in the vanishing noise limit, to the sum of an asymptotically geometric random variable and a Gumbel random variable. The duration also converges to a Gumbel variable with different parameters. We relate these results to recent work…
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“…When |∆| is slightly below the critical value, noise-induced phase slipping [10,[33][34][35] can be observed. Figure 3(d) shows the results of MC simulations of Eq.…”
Section: ∆ Is Of O(1)mentioning
confidence: 99%
“…When |∆| is slightly below the critical value, noise-induced phase slipping [10,[33][34][35] can be observed. Figure 3(d) shows the results of MC simulations of Eq.…”
Section: ∆ Is Of O(1)mentioning
confidence: 99%
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