Minimal control fields and pole-shifting by linear feedback

Casti JL (1976). Minimal control fields and pole-shifting by linear feedback. Applied Mathematics and Computation 2 (1): 19-28. DOI:10.1016/0096-3003(76)90017-5.

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Abstract

In this paper we consider the stabilization of constant linear systems by linear feedback controls. In particular, the problem of the number of components of the state which must be measured to achieve a prescribed location of the closed-loop poles is studied. A simple, computable necessary and sufficient condition is given for the omission of state variables from the measurement process. The theoretical results are illustrated by examples and a discussion of related topics for future resarch is given.

Item Type: Article
Research Programs: System and Decision Sciences - Core (SDS)
Bibliographic Reference: Applied Mathematics and Computation; 2(1):19-28 (Published online March 2002)
Depositing User: IIASA Import
Date Deposited: 15 Jan 2016 01:43
Last Modified: 19 Feb 2016 11:58
URI: http://pure.iiasa.ac.at/516

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