By Topic

Graphs of linear systems and stabilization

Sign In

Cookies must be enabled to login.After enabling cookies , please use refresh or reload or ctrl+f5 on the browser for the login options.

Formats Non-Member Member
$31 $13
Learn how you can qualify for the best price for this item!
Become an IEEE Member or Subscribe to
IEEE Xplore for exclusive pricing!
close button

puzzle piece

IEEE membership options for an individual and IEEE Xplore subscriptions for an organization offer the most affordable access to essential journal articles, conference papers, standards, eBooks, and eLearning courses.

Learn more about:

IEEE membership

IEEE Xplore subscriptions

2 Author(s)
Sefton, J.A. ; Center for Eng. Math., Texas Univ., Dallas, TX, USA ; Ober, R.J.

The authors show how geometric ideas can be applied in control theory and in particular in robust control in order to give further insight into of fundamental issues. It is shown that stability criteria for control systems can be stated in terms of geometric notions in the Hilbert space. Two ways of modeling uncertainty in robust control have received a considerable amount of attention: uncertainty in the gap metric and coprime factor perturbations. The connection between these two uncertainty descriptions is discussed. A result is given that gives a full characterization of the maximal ball in the gap metric that can be stabilized by a controller

Published in:

Decision and Control, 1991., Proceedings of the 30th IEEE Conference on

Date of Conference:

11-13 Dec 1991