Title :
Ellipsoidal sets for resilient and robust static output-feedback
Author :
Peaucelle, Dimitri ; Arzelier, Denis
Author_Institution :
LAAS CNRS, Toulouse, France
fDate :
6/1/2005 12:00:00 AM
Abstract :
The implementation of a controller, if not exact, may lead to the so-called fragility problem, i.e., the loss of expected closed-loop properties. In the present note, this difficult problem is dealt with considering robust static-output feedback (SOF) control for uncertain linear time-invariant systems. By analogy with robust analysis theory based on quadratic separation, a new formulation for the SOF design is shown to be a valuable way to tackle fragility issues. Indeed, the use of a quadratic separator for design purpose allows to define a whole resilient (nonfragile) set of SOF control laws. Results are formulated as matrix inequalities one of which is nonlinear. A numerical algorithm based on nonconvex optimization is provided ant its running is illustrated on classical examples from literature.
Keywords :
closed loop systems; continuous time systems; feedback; linear systems; matrix algebra; multivariable systems; optimisation; uncertain systems; closed-loop properties; ellipsoidal sets; fragility problem; matrix inequalities; nonconvex optimization; quadratic separation; resilient static output-feedback; robust analysis theory; robust static output-feedback; uncertain linear time-invariant systems; Control system synthesis; Control systems; Control theory; Linear feedback control systems; Linear matrix inequalities; Particle separators; Robust control; Robust stability; Robustness; Uncertainty; Fragility; linear matrix inequality (LMI); output-feedback; quadratic separation; robustness;
Journal_Title :
Automatic Control, IEEE Transactions on
DOI :
10.1109/TAC.2005.849256
