Title :
Computation of generalized inverses of periodic systems
Author_Institution :
Inst. of Robotics & Mechatronics, German Aerosp. Center, Wessling, Germany
Abstract :
We address the numerically reliable computation of generalized inverses of periodic systems. The underlying inverses are defined via the corresponding lifted representations. Structure preserving reduction of the associated system pencil to a special Kronecker-like form is the main computational ingredient for the proposed approach. This form can be computed by employing exclusively orthogonal transformations. For the computational algorithm of the generalized inverse, the backward numerical stability can be proved.
Keywords :
discrete time systems; inverse problems; periodic control; time-varying systems; associated system pencil; backward numerical stability; exclusively orthogonal transformations; generalized inverses; inverse systems; lifted representations; numerically reliable computation; periodic systems; structure preserving reduction; Codes; Computational complexity; Control theory; Filtering theory; Mechatronics; Numerical stability; Robots; Sparse matrices;
Conference_Titel :
Decision and Control, 2004. CDC. 43rd IEEE Conference on
Print_ISBN :
0-7803-8682-5
DOI :
10.1109/CDC.2004.1429666
