Title :
Limitations on the stabilizability of globally-minimum-phase systems
Author_Institution :
Dept. of Math., Rutgers Univ., New Brunswick, NJ, USA
fDate :
1/1/1990 12:00:00 AM
Abstract :
The author gives examples showing that, in general, it is possible for a globally-minimum-phase system in normal form to have states that cannot be driven asymptotically to the origin by means of any open-loop control. In particular, this provides counterexamples to a number of recently published stabilization theorems. It is established, by means of examples, that a minimum-phase system in normal form need not be semiglobally stabilizable or small-input semiglobally BIBO stabilizable, even if the zero dynamics is exponentially stable and the completeness condition holds
Keywords :
matrix algebra; set theory; stability; globally-minimum-phase system; matrix algebra; set theory; small-input semiglobally BIBO stabilizable; stabilisability limitations; Algorithm design and analysis; Application software; Approximation algorithms; Automatic control; Control systems; Control theory; Design engineering; Design optimization; Nonlinear control systems; State feedback;
Journal_Title :
Automatic Control, IEEE Transactions on
