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Эта публикация цитируется в 10 научных статьях (всего в 10 статьях)
Attractor of Smale–Williams Type in an Autonomous Distributed System
Vyacheslav P. Kruglovab, Sergey P. Kuznetsovcb, Arkady Pikovskya a Department of Physics and Astronomy, University of Potsdam,
Karl-Liebknecht-Str. 24/25, D-14476 Potsdam-Golm, Germany
b Saratov State University,
ul. Astrakhanskaya 83, Saratov, 410012 Russia
c Kotel’nikov’s Institute of Radio-Engineering and Electronics of RAS, Saratov Branch,
ul. Zelenaya 38, Saratov, 410019 Russia
Аннотация:
We consider an autonomous system of partial differential equations for a onedimensional distributed medium with periodic boundary conditions. Dynamics in time consists of alternating birth and death of patterns with spatial phases transformed from one stage of activity to another by the doubly expanding circle map. So, the attractor in the Poincaré section is uniformly hyperbolic, a kind of Smale–Williams solenoid. Finite-dimensional models are derived as ordinary differential equations for amplitudes of spatial Fourier modes (the 5D and 7D models). Correspondence of the reduced models to the original system is demonstrated numerically. Computational verification of the hyperbolicity criterion is performed for the reduced models: the distribution of angles of intersection for stable and unstable manifolds on the attractor is separated from zero, i.e., the touches are excluded. The example considered gives a partial justification for the old hopes that the chaotic behavior of autonomous distributed systems may be associated with uniformly hyperbolic attractors.
Ключевые слова:
Smale–Williams solenoid, hyperbolic attractor, chaos, Swift–Hohenberg equation, Lyapunov exponent.
Поступила в редакцию: 30.01.2014 Принята в печать: 18.02.2014
Образец цитирования:
Vyacheslav P. Kruglov, Sergey P. Kuznetsov, Arkady Pikovsky, “Attractor of Smale–Williams Type in an Autonomous Distributed System”, Regul. Chaotic Dyn., 19:4 (2014), 483–494
Образцы ссылок на эту страницу:
https://www.mathnet.ru/rus/rcd175 https://www.mathnet.ru/rus/rcd/v19/i4/p483
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