Alexander P. Kuznetsov, Natalia A. Migunova, Igor R. Sataev, Yuliya V. Sedova, Ludmila V. Turukina, “From Chaos to Quasi-Periodicity”, Regul. Chaotic Dyn., 2015, Volume 20, Issue 2,Pages <nobr>189

This article is cited in 18 papers

From Chaos to Quasi-Periodicity

Alexander P. Kuznetsov^ab, Natalia A. Migunova^b, Igor R. Sataev^a, Yuliya V. Sedova^a, Ludmila V. Turukina^ab

^a Kotel’nikov Institute of Radio Engineering and Electronics of RAS, Saratov Branch, ul. Zelenaya 38, Saratov, 410019 Russia
^b Saratov State University, ul. Astrakhanskaya 83, Saratov, 410012 Russia

Abstract: Ensembles of several Rössler chaotic oscillators are considered. It is shown that a typical phenomenon for such systems is the emergence of different and sufficiently high dimensional invariant tori. The possibility of a quasi-periodic Hopf bifurcation and a cascade of such bifurcations based on tori of increasing dimension is demonstrated. The domains of resonance tori are revealed. Boundaries of these domains correspond to the saddle-node bifurcations. Inside the domains of resonance modes, torus-doubling bifurcations and destruction of tori are observed.

Keywords: chaos, quasi-periodic oscillation, invariant torus, Lyapunov exponent, bifurcation.

MSC: 70K43, 65P20, 65P30, 34D08

Received: 19.01.2015

Language: English

DOI: 10.1134/S1560354715020070