2003
DOI: 10.1142/s0218127403008636
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Pseudo-Deterministic Chaotic Systems

Abstract: We call a chaotic dynamical system pseudo-deterministic when it does not produce numerical, or pseudo-trajectories that stay close, or shadow chaotic true trajectories, even though the model equations are strictly deterministic. In this case, single chaotic trajectories may not be meaningful, and only statistical predictions, at best, could be drawn on the model, like in a stochastic system. The dynamical reason for this behavior is nonhyperbolicity characterized either by tangencies of stable and unstable man… Show more

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Cited by 25 publications
(16 citation statements)
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“…This figure is very similar to the corresponding diagram for the infinitetime Lyapunov exponents [16,23]. In fact, for Gaussian distributions it follows that [8] Figure 7 points out that the average time-n exponent crosses zero at a constant rate in the neighborhood of the hyper-chaos transition. Since the distributions depicted in Fig.…”
Section: Kicked Double Rotor Mapsupporting
confidence: 75%
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“…This figure is very similar to the corresponding diagram for the infinitetime Lyapunov exponents [16,23]. In fact, for Gaussian distributions it follows that [8] Figure 7 points out that the average time-n exponent crosses zero at a constant rate in the neighborhood of the hyper-chaos transition. Since the distributions depicted in Fig.…”
Section: Kicked Double Rotor Mapsupporting
confidence: 75%
“…In other words, the relative weight of local expansions or contractions is roughly the same, what is the worst situation when one tries to obtain a "true" chaotic trajectory which shadows a numerical one. This argument can be made more precise by assigning these relative contributions of contractions and expansions the weights of unstable periodic orbits with different unstable dimensions by computing the natural measure of the chaotic attractor [23,8].…”
Section: Kicked Double Rotor Mapmentioning
confidence: 99%
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“…Such Markov chains can be obtained by so-called Markov partitions that exist for hyperbolic dynamical systems (Sinai [82], Bowen [83], Ruelle [84]). For non-hyperbolic systems, no corresponding existence theorem is available, and the construction can be even more tedious than for hyperbolic systems (Viana et al [85]). For instance, both Markov and generating partitions for nonlinear systems are generally non-homogeneous, i.e., their cells are typically of different sizes and forms (see Remark A10).…”
Section: Generating Partitionsmentioning
confidence: 99%
“…For non-hyperbolic systems, much less is known (cf. Viana et al 2003). Now let us introduce the notion of epistemic observables.…”
mentioning
confidence: 99%