Title :
Dynamics of a 3D elastic string pendulum
Author :
Lee, Taeyoung ; Leok, Melvin ; McClamroch, N. Harris
Author_Institution :
Mech. & Aerosp. Eng., Florida Inst. of Technol., Melbourne, FL, USA
Abstract :
This paper presents an analytical model and a geometric numerical integrator for a rigid body connected to an elastic string, acting under a gravitational potential. Since the point where the string is attached to the rigid body is displaced from the center of mass of the rigid body, there exist nonlinear coupling effects between the string deformation and the rigid body dynamics. A geometric numerical integrator, referred to as a Lie group variational integrator, is developed to numerically preserve the Hamiltonian structure of the presented model and its Lie group configuration manifold. These properties are illustrated by a numerical simulation.
Keywords :
Lie groups; pendulums; string theory; 3D elastic string pendulum; Hamiltonian structure; Lie group configuration manifold; Lie group variational integrator; analytical model; geometric numerical integrator; gravitational potential; nonlinear coupling effects; rigid body dynamics; string deformation; Aerodynamics; Aerospace engineering; Analytical models; Couplings; Deformable models; Equations; Manifolds; Numerical simulation; Solid modeling; Vehicle dynamics;
Conference_Titel :
Decision and Control, 2009 held jointly with the 2009 28th Chinese Control Conference. CDC/CCC 2009. Proceedings of the 48th IEEE Conference on
Conference_Location :
Shanghai
Print_ISBN :
978-1-4244-3871-6
Electronic_ISBN :
0191-2216
DOI :
10.1109/CDC.2009.5399611
