Noise-Enhanced Trapping in Chaotic Scattering

Altmann, Eduardo G.; Endler, Antônio

doi:10.1103/physrevlett.105.244102

Cited by 48 publications

(69 citation statements)

References 41 publications

(85 reference statements)

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“…This occurs just for finite times and we expect an exponential decay for larger times (not shown), as nicely discussed in [5] for the case of noise. Amazingly, all the dynamics shown in Figs.…”

Section: Diffusion Channels and The Penetration Of Islandsmentioning

confidence: 78%

“…It was observed that the RTS is capable of describing the relevant aspects of the dynamics in complex systems. In this context, we mention that the RTS is able to describe universal algebraic decays in Hamiltonian systems [2][3][4], including random walk penetration of the Kolmogorov-Arnold-Moser (KAM) islands [5,6], biased random walk to escape from KAM island [7], DNA sequence [8], synchronization of oscillator [9], generalized bifurcation diagram of conservative systems [10], fine structure of resonance islands [11], transient chaos in systems with leaks [12], among others.…”

Section: Introductionmentioning

confidence: 99%

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Recurrence-time statistics in non-Hamiltonian volume-preserving maps and flows

2015

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We analyze the recurrence-time statistics (RTS) in three-dimensional non-Hamiltonian volume preserving systems (VPS): an extended standard map, and a fluid model. The extended map is a standard map weakly coupled to an extra-dimension which contains a deterministic regular, mixed (regular and chaotic) or chaotic motion. The extra-dimension strongly enhances the trapping times inducing plateaus and distinct algebraic and exponential decays in the RTS plots. The combined analysis of the RTS with the classification of ordered and chaotic regimes and scaling properties, allows us to describe the intricate way trajectories penetrate the before impenetrable regular islands from the uncoupled case. Essentially the plateaus found in the RTS are related to trajectories that stay long times inside trapping tubes, not allowing recurrences, and then penetrates diffusively the islands (from the uncoupled case) by a diffusive motion along such tubes in the extra-dimension. All asymptotic exponential decays for the RTS are related to an ordered regime (quasi-regular motion) and a mixing dynamics is conjectured for the model. These results are compared to the RTS of the standard map with dissipation or noise, showing the peculiarities obtained by using three-dimensional VPS. We also analyze the RTS for a fluid model and show remarkable similarities to the RTS in the extended standard map problem.

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Section: Diffusion Channels and The Penetration Of Islandsmentioning

confidence: 78%

Section: Introductionmentioning

confidence: 99%

Recurrence-time statistics in non-Hamiltonian volume-preserving maps and flows

2015

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“…The map (1) was evolved in the presence of noise with the distribution (4). The variance σ of the noise was set to a small value, namely 10 −5 and was kept constant, while the variance of K, σ K , was varied and the diffusion coefficient was calculated by (9) and (14). The corresponding numerical calculations were done for 200 different values of K in the intervalK min = 5 andK max = 30.…”

Section: Comparison Of the Results Found For The Two Different Ementioning

confidence: 99%

“…2 the diffusion coefficient is presented for moderate σ K =1. Numerical and analytical calculations are shown for the two types and compared with (6) where K is replaced bȳ K. Depletion or blurring of the accelerator modes is clearly shown for type II processes, such that for this value of σ K the diffusion is well described by (14). RRW [12] found that the peak of the accelerator mode is obtained by summation Fourier paths of very high order (Fig 9 in [12]).…”

Section: Fig 1: (Color Online) Diffusion Coefficients Found By Numermentioning

confidence: 99%

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Diffusion for ensembles of standard maps

Alus¹,

Fishman²

2015

Phys. Rev. E

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Two types of random evolution processes are studied for ensembles of the standard map with driving parameter K that determines its degree of stochasticity. For one type of processes the parameter K is chosen at random from a Gaussian distribution and is then kept fixed, while for the other type it varies from step to step. In addition, noise that can be arbitrarily weak is added. The ensemble average and the average over noise of the diffusion coefficient is calculated for both types of processes. These two types of processes are relevant for two types of experimental situations as explained in the paper. Both types of processes destroy fine details of the dynamics, and the second process is found to be more effective in destroying the fine details. We hope that this work is a step in the efforts for developing a statistical theory for systems with mixed phase

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