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JOURNALS // Regular and Chaotic Dynamics // Archive

Regul. Chaotic Dyn., 2015 Volume 20, Issue 5, Pages 605–626 (Mi rcd22)

This article is cited in 29 papers

Dynamics of the Suslov Problem in a Gravitational Field: Reversal and Strange Attractors

Ivan A. Bizyaevab, Alexey V. Borisovb, Alexey O. Kazakovac

a Udmurt State University, ul. Universitetskaya 1, Izhevsk, 426034 Russia
b Steklov Mathematical Institute, Russian Academy of Sciences, ul. Gubkina 8, Moscow, 119991 Russia
c National Research University Higher School of Economics, ul. Rodionova 136, Nizhny Novgorod, 603093 Russia

Abstract: In this paper, we present some results on chaotic dynamics in the Suslov problem which describe the motion of a heavy rigid body with a fixed point, subject to a nonholonomic constraint, which is expressed by the condition that the projection of angular velocity onto the body-fixed axis is equal to zero. Depending on the system parameters, we find cases of regular (in particular, integrable) behavior and detect various attracting sets (including strange attractors) that are typical of dissipative systems. We construct a chart of regimes with regions characterizing chaotic and regular regimes depending on the degree of conservativeness. We examine in detail the effect of reversal, which was observed previously in the motion of rattlebacks.

Keywords: Suslov problem, nonholonomic constraint, reversal, strange attractor.

MSC: 37J60, 37N15, 37G35, 70E18, 70F25, 70H45

Received: 14.08.2015

Language: English

DOI: 10.1134/S1560354715050056



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