Optimal Control of Nonholonomic Motion Planning for a Free-Falling Cat

Author

Ge, Xin-Sheng ; Zhang, Qi-Zhi

Author_Institution

Basic Sci. Courses Dept., Beijing Inst. of Machinery

Volume

2

fYear

2006

fDate

Aug. 30 2006-Sept. 1 2006

Firstpage

599

Lastpage

602

Abstract

The nonholonomic motion planning of a free-falling cat is investigated. Nonholonomicity arises in a free-falling cat subject to nonintegrable angle velocity constraints or nonintegrable conservation laws. When the total angular momentum is zero, the motion equation of a free-falling cat is established based on the model of two symmetric rigid bodies and conservation of angular momentum. The control of system can be converted to the problem of nonholonomic motion planning for a free-falling cat. Based on Ritz approximation theory, the Gauss-Newton method for motion planning by a falling cat is proposed. The effectiveness of the numerical algorithm is demonstrated through simulation on model of a falling cat

Keywords

Newton method; angular momentum; approximation theory; biomechanics; conservation laws; motion control; optimal control; path planning; Gauss-Newton method; Ritz approximation theory; angular momentum conservation; free-falling cat; nonholonomic motion planning; nonintegrable angle velocity constraints; nonintegrable conservation laws; optimal control; symmetric rigid bodies; Approximation methods; Control systems; Gaussian approximation; Machinery; Motion control; Nonlinear equations; Optimal control; Physiology; Spinning; Tail;

fLanguage

English

Publisher

ieee

Conference_Titel

Innovative Computing, Information and Control, 2006. ICICIC '06. First International Conference on

Conference_Location

Beijing

Print_ISBN

0-7695-2616-0

Type

conf

DOI

10.1109/ICICIC.2006.324

Filename

1692058