DocumentCode
488863
Title
Geometry and the Dynamic Interpolation Problem
Author
Crouch, P. ; Leite, F.Silva
Author_Institution
Center for Systems Science and Engineering, Arizona State University, Tempe, AZ 85287-USA
fYear
1991
fDate
26-28 June 1991
Firstpage
1131
Lastpage
1136
Abstract
In this paper we consider the dynamic interpolation problem for control systems in which certain dynamic variables of state trajectories are forced to pass through specific points by suitable choices of controls. This problem can be viewed as an extension of the spline problem. Following Noakes, Heinzinger and Paden [16], we give a derivation of suitable interpolating cubic splines on a Riemannian manifold extending the variational approach in Milnor [15]. For the special case of compact Lie groups, the relation with optimal control problems and singular Riemannian Geometry is spelled out in detail.
Keywords
Computational geometry; Control systems; Cost function; Differential equations; Force control; Interpolation; Nonlinear control systems; Optimal control; Spline; Systems engineering and theory;
fLanguage
English
Publisher
ieee
Conference_Titel
American Control Conference, 1991
Conference_Location
Boston, MA, USA
Print_ISBN
0-87942-565-2
Type
conf
Filename
4791552
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