2019
DOI: 10.1007/s11141-019-09935-4
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Chaotic Dynamics and Multistability in the Nonholonomic Model of a Celtic Stone

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Cited by 13 publications
(5 citation statements)
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“…Discrete Shilinikov attractors were found in different dynamical systems such as the generalized three-dimensional Hénon maps, nonholonomic models of Chaplygin top [38] and Celtic stone [45], the model of coupled identical oscillators [39].However, not in all cases they were identified as hyperchaotic attractors. Apparently, in some cases the expansion of two-dimensional areas near a saddle-focus orbit with a two-dimensional unstable manifold is compensated by the volume contraction near some other saddle periodic orbits that also belong to the attractor, but which have only a one-dimensional unstable manifold.…”
Section: Transition To Chaos and Hyperchaosmentioning
confidence: 99%
See 1 more Smart Citation
“…Discrete Shilinikov attractors were found in different dynamical systems such as the generalized three-dimensional Hénon maps, nonholonomic models of Chaplygin top [38] and Celtic stone [45], the model of coupled identical oscillators [39].However, not in all cases they were identified as hyperchaotic attractors. Apparently, in some cases the expansion of two-dimensional areas near a saddle-focus orbit with a two-dimensional unstable manifold is compensated by the volume contraction near some other saddle periodic orbits that also belong to the attractor, but which have only a one-dimensional unstable manifold.…”
Section: Transition To Chaos and Hyperchaosmentioning
confidence: 99%
“…It depends on the transition from the stable multi-round torus to chaotic regime. In all known models demonstrating the onset of the discrete Shilnikov attractor (in three-dimensional Hénon maps [19], nonholonomic models of Chaplygin top [38] and Celtic stone [45]) this inclusion happens in a soft manner by a smooth transformation of a torus-chaos attractors. However, we also suppose that a saddle-focus orbit can be included to the chaotic attractor sharply due to the crisis of multi-round torus-chaos attractor.…”
Section: Transition To Hyperchaos In System (1)mentioning
confidence: 99%
“…This in itself is not a new phenomenon. Flow-like chaotic attractors were previously observed in the three-dimensional Hénon map [36], in the Lorenz-84 model [15], in some class of 3D diffeomorphisms of the torus [14], in nonholonomic models of Celtic stone [28] and Chaplygin top [12], in models of identical globally coupled oscillators [42] and in other systems. In this section we give an explanation for this phenomenon suitable for the map (6) as well as for many other cases.…”
Section: Chaotic Attractors With Zero Second Lementioning
confidence: 76%
“…It can lead to chaos with only one positive Lyapunov exponent. Such phenomenon was observed, for example, in nonholonomic models of Celtic stone [44] and Chaplygin top [43], in models of identical globally coupled oscillators [45] and in other systems. In this section we show that the same phenomenon can be observed in the map under consideration, i.e., depending on values of the Jacobian, discrete Shilnikov attractors in the three-dimensional Mirá map can have either two or only one positive Lyapunov exponent.…”
Section: Various Types Of Discrete Shilnikov Attractorsmentioning
confidence: 87%
“…Such transition to chaotic attractors (including Shilnikov ones), is observed quite often (see e.g. [38,39,40,41,42,43,44,45,46,47]) and can lead to the birth of "flow-like" chaotic attractors possessing one positive and one very close to zero Lyapunov exponent (for flow systems chaos with additional close to zero Lyapunov exponent in the spectrum is observed in this case). In Sec.…”
Section: (A)mentioning
confidence: 93%