DocumentCode
2974587
Title
Approximate models of rotating beams
Author
Bloch, Anthony M. ; Ryan, Robert R.
Author_Institution
Dept. of Theoretical & Appl. Mech., Ohio State Univ., OH, USA
fYear
1988
fDate
7-9 Dec 1988
Firstpage
1230
Abstract
The authors consider some discrete, low-dimensional models of freely rotating and driven beams. They consider models representing both the inextensible and the extensible case. Stability of the rotational motion of these models is analyzed by the energy-Casimir method, and comparison with the behavior of full infinite-dimensional models is made. A discussion is also presented of the Poisson structure of these models
Keywords
multidimensional systems; stability; Poisson structure; energy-Casimir method; extensible; inextensible; infinite-dimensional models; low-dimensional models; multidimensional systems; rotating beams; rotational motion; stability; Angular velocity; Chaos; Control systems; Large-scale systems; Mathematical model; Mathematics; Mechanical engineering; Motion analysis; Space stations; Stability analysis;
fLanguage
English
Publisher
ieee
Conference_Titel
Decision and Control, 1988., Proceedings of the 27th IEEE Conference on
Conference_Location
Austin, TX
Type
conf
DOI
10.1109/CDC.1988.194517
Filename
194517
Link To Document