Please use this identifier to cite or link to this item: https://hdl.handle.net/20.500.14365/3941
Title: An optimal control problem for rigid body motions on lie group SO(2, 1) [pp. 1068-1073]
Authors: Abazari N.
Sager I.
Keywords: Darboux vector
Hamiltonian vector field
Lie group
Lorentz metric
Maximum principle
Optimal control
Rigid body motion
Darboux vector
Hamiltonian vector field
Lie group
Lorentz
Optimal controls
Rigid-body motion
Control
Curve fitting
Maximum principle
Motion planning
Optimization
Rigid structures
Vectors
Hamiltonians
Abstract: In this paper smooth trajectories are computed in the Lie group SO(2, 1) as a motion planning problem by assigning a Frenet frame to the rigid body system to optimize the cost function of the elastic energy which is spent to track a timelike curve in Minkowski space. A method is proposed to solve a motion planning problem that minimize the integral of the square norm of Darboux vector of a timelike curve. This method uses the coordinate free Maximum Principle of Optimal control and results in the theory of integrable Hamiltonian systems. The presence of several conversed quantities inherent in these Hamiltonian systems aids in the explicit computation of the rigid body motions.
URI: https://hdl.handle.net/20.500.14365/3941
ISSN: 2010-376X
Appears in Collections:Scopus İndeksli Yayınlar Koleksiyonu / Scopus Indexed Publications Collection

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