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JOURNALS // Regular and Chaotic Dynamics // Archive

Regul. Chaotic Dyn., 2013 Volume 18, Issue 5, Pages 508–520 (Mi rcd136)

This article is cited in 47 papers

Strange Attractors and Mixed Dynamics in the Problem of an Unbalanced Rubber Ball Rolling on a Plane

Alexey O. Kazakovab

a The Research Institute of Applied Mathematics and Cybernetics, Nizhny Novgorod State University, pr. Gagarina 23, Nizhny Novgorod, 603950, Russia
b Institute of computer science, ul. Universitetskaya 1, Izhevsk, 426034, Russia

Abstract: We consider the dynamics of an unbalanced rubber ball rolling on a rough plane. The term rubber means that the vertical spinning of the ball is impossible. The roughness of the plane means that the ball moves without slipping. The motions of the ball are described by a nonholonomic system reversible with respect to several involutions whose number depends on the type of displacement of the center of mass. This system admits a set of first integrals, which helps to reduce its dimension. Thus, the use of an appropriate two-dimensional Poincaré map is enough to describe the dynamics of our system. We demonstrate for this system the existence of complex chaotic dynamics such as strange attractors and mixed dynamics. The type of chaotic behavior depends on the type of reversibility. In this paper we describe the development of a strange attractor and then its basic properties. After that we show the existence of another interesting type of chaos — the so-called mixed dynamics. In numerical experiments, a set of criteria by which the mixed dynamics may be distinguished from other types of dynamical chaos in two-dimensional maps is given.

Keywords: mixed dynamics, strange attractor, unbalanced ball, rubber rolling, reversibility, two-dimensional Poincaré map, bifurcation, focus, saddle, invariant manifolds, homoclinic tangency, Lyapunov’s exponents.

MSC: 37J60, 37N15, 37G35

Received: 30.05.2013
Accepted: 03.09.2013

Language: English

DOI: 10.1134/S1560354713050043



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