DocumentCode :
822548
Title :
Numerical experiments in linear control theory using generalized 
equations
equationsAuthor :
Casti, J. ; Kirschner, O.
Author_Institution :
International Institute for Applied Systems Analysis, Laxenburg, Austria
Volume :
21
Issue :
5
fYear :
1976
fDate :
10/1/1976 12:00:00 AM
Firstpage :
792
Lastpage :
795
Abstract :
Numerical investigations of the relative efficiency of Riccati versus non-Riccati based approaches to the determination of optimal feedback gains for linear dynamics-quadratic cost control processes over a finite interval are presented. The non-Riccati algorithms used are the so-called generalized 
functions [1] or Chandrasekhar-type [2] algorithms. The results of the experiments show that the generalized approach has significant computational advantages over the usual Riccati equation and, in many cases, the computational gain exceeds rough estimates based solely upon a count of the number of equations to be integrated.
functions [1] or Chandrasekhar-type [2] algorithms. The results of the experiments show that the generalized approach has significant computational advantages over the usual Riccati equation and, in many cases, the computational gain exceeds rough estimates based solely upon a count of the number of equations to be integrated.Keywords :
Chandrasekhar equations; Differential Riccati equations; Linear systems, time-invariant continuous-time; Numerical integration; Optimal control; Riccati equations, differential; Automatic control; Control systems; Control theory; Gain; Linear feedback control systems; Optimal control; Process control; Riccati equations; State-space methods; Sufficient conditions;
fLanguage :
English
Journal_Title :
Automatic Control, IEEE Transactions on
Publisher :
ieee
ISSN :
0018-9286
Type :
jour
DOI :
10.1109/TAC.1976.1101351
Filename :
1101351
Link To Document :
