Title :
Numerical optimization on the Euclidean group with applications to camera calibration
Author :
Gwak, Seungwoong ; Kim, Junggon ; Park, Frank Chongwoo
Author_Institution :
Sch. of Mech. & Aerosp. Eng., Seoul Nat. Univ., South Korea
fDate :
2/1/2003 12:00:00 AM
Abstract :
We present the cyclic coordinate descent (CCD) algorithm for optimizing quadratic objective functions on SE(3), and apply it to a class of robot sensor calibration problems. Exploiting the fact that SE(3) is the semidirect product of SO(3) and ℜ3, we show that by cyclically optimizing between these two spaces, global convergence can be assured under a mild set of assumptions. The CCD algorithm is also invariant with respect to choice of fixed reference frame (i.e., left invariant, as required by the principle of objectivity). Examples from camera calibration confirm the simplicity, efficiency, and robustness of the CCD algorithm on SE(3), and its wide applicability to problems of practical interest in robotics.
Keywords :
Lie groups; calibration; convergence of numerical methods; differential geometry; gradient methods; minimisation; robot kinematics; robot vision; Euclidean group; Hessian; camera calibration; cyclic coordinate descent algorithm; cyclic optimization; fixed reference frame; global convergence; left invariant; numerical optimization; principle of objectivity; quadratic objective function optimization; robot kinematics; robot sensor calibration problems; robotics; robustness; rotation group; semidirect product; Calibration; Cameras; Charge coupled devices; Charge-coupled image sensors; Convergence; Orbital robotics; Robot kinematics; Robot sensing systems; Robot vision systems; Robustness;
Journal_Title :
Robotics and Automation, IEEE Transactions on
DOI :
10.1109/TRA.2002.807530
