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. 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: 27 Aug 2021 17:26
URI: https://pure.iiasa.ac.at/12675

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