ЖЭТФ, Том 145,
Вып. 3,
стр. 565 (Март 2014)
(Английский перевод - JETP,
Vol. 118, No 3,
p. 494,
March 2014
доступен on-line на www.springer.com
)
BISTABILITY IN A HYPERCHAOTIC SYSTEM WITH A LINE EQUILIBRIUM
Li Ch., Spott J.C., Thio W.
Поступила в редакцию: 26 Октября 2013
DOI: 10.7868/S0044451014030197
A hyperchaotic system with an infinite line of equilibrium points is described. A criterion is proposed for quantifying the hyperchaos, and the position in the three-dimensional parameter space where the hyperchaos is largest is determined. In the vicinity of this point, different dynamics are observed including periodicity, quasi-periodicity, chaos, and hyperchaos. Under some conditions, the system has a unique bistable behavior, characterized by a symmetric pair of coexisting limit cycles that undergo period doubling, forming a symmetric pair of strange attractors that merge into a single symmetric chaotic attractor that then becomes hyperchaotic. The system was implemented as an electronic circuit whose behavior confirms the numerical predictions.
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