DocumentCode
303083
Title
Convex constrained control problem for 2-D systems
Author
Gaishun, I.
Author_Institution
Inst. of Math., Acad. of Sci., Minsk
Volume
1
fYear
1996
fDate
17-20 Jun 1996
Firstpage
150
Abstract
A problem of optimal control for a discrete 2-D system with convex mixed constraints and convex cost functional is investigated. The problem under consideration is reduced to a convex programming problem in Banach space. For the obtained problem the properties of Frechet differentiability are determinated. Necessary optimality conditions are established in terms of the solutions for the linearized dual problem
Keywords
Banach spaces; control system analysis; convex programming; discrete systems; optimal control; Banach space; Frechet differentiability; control simulation; convex constrained control problem; convex cost functional; convex mixed constraints; convex programming problem; discrete 2-D system; linearized dual problem solutions; optimal control problem; optimality conditions; Control systems; Cost function; Digital filters; Filtering; Functional programming; Mathematics; Multidimensional systems; Nonlinear control systems; Optimal control; Stability;
fLanguage
English
Publisher
ieee
Conference_Titel
Industrial Electronics, 1996. ISIE '96., Proceedings of the IEEE International Symposium on
Conference_Location
Warsaw
Print_ISBN
0-7803-3334-9
Type
conf
DOI
10.1109/ISIE.1996.548409
Filename
548409
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