Title :
Least squares tracking on the Euclidean group
Author :
Han, Youngmo ; Park, F.C.
Author_Institution :
Sch. of Mech. & Aerosp. Eng., Seoul Nat. Univ., South Korea
fDate :
7/1/2001 12:00:00 AM
Abstract :
A large class of problems in robotics, e.g., trajectory tracking with obstacle avoidance, compliant motion control, and complex assembly, can be formulated as a least-squares tracking problem on the Euclidean group subject to constraints on the state and/or control. We develop an optimal control framework for this general class of problems, and derive analytic solutions for the local and global versions of the general optimal control problem. Our formalism can be viewed in some sense as an extension to the Euclidean group of the linear quadratic regulator subject to state equality constraints. Examples from force-guided complex assembly and tracking with obstacle avoidance are given
Keywords :
Lie groups; assembling; compliance control; least squares approximations; linear quadratic control; matrix algebra; motion control; robots; tracking; Euclidean group; analytic solutions; complex assembly; compliant motion control; force-guided complex assembly; least squares tracking; linear quadratic regulator; obstacle avoidance; optimal control framework; trajectory tracking; Control theory; Equations; Least squares methods; Motion control; Optimal control; Orbital robotics; Regulators; Robotic assembly; Tracking; Trajectory;
Journal_Title :
Automatic Control, IEEE Transactions on
