Necessary and sufficient conditions in the minimal control field problem for linear systems

Casti J (1976). Necessary and sufficient conditions in the minimal control field problem for linear systems. International Journal of Systems Science 7 (5): 493-500. DOI:10.1080/00207727608941934.

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Abstract

This paper considers the problem of finding necessary and sufficient conditions for stabilizing the linear system x = Fx+Gu by means of feedback control laws u=Kx measuring as few components of x as possible. Easily computable conditions are given which insure that a given component of x may be eliminated from a stabilizing law (sufficiency), as well as simple conditions which must bo satisfied if a given component is to be so eliminated. Unfortunately, these conditions are not one and the same but numerical examples are given to demonstrate their utility none the less.

Item Type: Article
Research Programs: System and Decision Sciences - Core (SDS)
Depositing User: Romeo Molina
Date Deposited: 14 Apr 2016 08:20
Last Modified: 14 Apr 2016 08:20
URI: http://pure.iiasa.ac.at/12675

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