par Peng, Youbin 
;Kinnaert, Michel
Référence IEEE transactions on automatic control, AC-37, page (633-636)
Publication Publié, 1992
;Kinnaert, Michel Référence IEEE transactions on automatic control, AC-37, page (633-636)
Publication Publié, 1992
Article révisé par les pairs
| Résumé : | In this note, an explicit solution to the multivariable discrete linear quadratic (LQ) regulation problem is obtained in the limiting singular case where the input weighting matrix tends to zero. Such a solution follows from a suitable spectral factorization of the input spectrum density matrix under the assumption that the system is stabilizable and detectable, and its transfer function matrix is of full rank. The suitable spectral factor is shown to be the product of the system minimum-phase image and its unitary interactor matrix. The unitary interactor matrix defined here is a special case of the nilpotent interactor matrix defined in [5]. © 1992 IEEE |
