The rolling ball problem on the plane revisited

被引：1

作者：

Biscolla, Laura M. O. ^{[1
,2
]}

Llibre, Jaume ^{[3
]}

Oliva, Waldyr M. ^{[4
,5
]}

机构：

[1] Univ Estadual Paulista, BR-04026002 Sao Paulo, Brazil

[2] Univ Sao Judas Tadeu, BR-03166000 Sao Paulo, Brazil

[3] Univ Autonoma Barcelona, Dept Matemat, E-08193 Barcelona, Catalonia, Spain

[4] Univ Tecn Lisboa, CAMGSD, ISR, Inst Super Tecn, P-1049001 Lisbon, Portugal

[5] Univ Sao Paulo, Dept Matemat Aplicada, Inst Matemat & Estat, BR-05508900 Sao Paulo, Brazil

来源：

ZEITSCHRIFT FUR ANGEWANDTE MATHEMATIK UND PHYSIK | 2013年 / 64卷 / 04期

关键词：

Control theory; Rolling ball; Kendall problem; Hammersley problem;

D O I：

10.1007/s00033-012-0279-8

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

By a sequence of rollings without slipping or twisting along segments of a straight line of the plane, a spherical ball of unit radius has to be transferred from an initial state to an arbitrary final state taking into account the orientation of the ball. We provide a new proof that with at most 3 moves, we can go from a given initial state to an arbitrary final state. The first proof of this result is due to Hammersley ( 1983). His proof is more algebraic than ours which is more geometric. We also showed that "generically" no one of the three moves, in any elimination of the spin discrepancy, may have length equal to an integral multiple of 2 pi.

引用

页码：991 / 1003

页数：13

共 50 条

[1] The rolling ball problem on the plane revisited
Laura M. O. Biscolla
Jaume Llibre
Waldyr M. Oliva
[J]. Zeitschrift für angewandte Mathematik und Physik, 2013, 64 : 991 - 1003
[2] Asymptotics of Extremal Curves in the Ball Rolling Problem on the Plane
Mashtakov A.P.
[J]. Journal of Mathematical Sciences, 2014, 199 (6) : 687 - 694
[3] Different Models of Rolling for a Robot Ball on a Plane as a Generalization of the Chaplygin Ball Problem
Ivan A. Bizyaev
Alexey V. Borisov
Ivan S. Mamaev
[J]. Regular and Chaotic Dynamics, 2019, 24 : 560 - 582
[4] Different Models of Rolling for a Robot Ball on a Plane as a Generalization of the Chaplygin Ball Problem
Bizyaev, Ivan A.
Borisov, Alexey V.
Mamaev, Ivan S.
[J]. REGULAR & CHAOTIC DYNAMICS, 2019, 24 (05): : 560 - 582
[5] A BALL ROLLING ON A ROTATING PLANE
ABDELKADER, MA
[J]. ZEITSCHRIFT FUR ANGEWANDTE MATHEMATIK UND MECHANIK, 1986, 66 (11): : 563 - 564
[6] Resistance to rolling of a ball on a plane
E. A. Bulanov
[J]. Journal of Machinery Manufacture and Reliability, 2007, 36 (5) : 430 - 433
[7] Plane problem on a heavy ball rolling in a spherical recess of an inverted pendulum
Legeza, VP
[J]. INTERNATIONAL APPLIED MECHANICS, 2001, 37 (08) : 1089 - 1093
[8] Plane Problem on a Heavy Ball Rolling in a Spherical Recess of an Inverted Pendulum
V. P. Legeza
[J]. International Applied Mechanics, 2001, 37 : 1089 - 1093
[9] Resistance to Rolling of a Ball on a Plane
Bulanov, E. A.
[J]. JOURNAL OF MACHINERY MANUFACTURE AND RELIABILITY, 2007, 36 (05) : 430 - 433
[10] Strange attractors and mixed dynamics in the problem of an unbalanced rubber ball rolling on a plane
Alexey O. Kazakov
[J]. Regular and Chaotic Dynamics, 2013, 18 : 508 - 520

← 1 2 3 4 5 →