Title :
On the strong stabilization problem and performance of stable ℋ∞ controllers
Author :
Zeren, Murat ; Özbay, Hitay
Author_Institution :
Dept. of Electr. Eng., Ohio State Univ., Columbus, OH, USA
Abstract :
A strong stabilization problem is considered for MIMO finite dimensional linear time invariant systems. It is shown that if an algebraic Riccati equation (ARE) has a positive semi-definite solution, then a strongly stabilizing controller can be constructed using state space techniques. This controller is of the same order as the plant. Moreover, under this sufficient condition, a finite dimensional characterization of a fairly large set of strongly stabilizing controllers is obtained. Using a similar ARE, the authors (1996) constructed a stable suboptimal ℋ∞ controller of order 2n, where n is the order of the generalized plant. The ℋ∞ performance level attained by this controller is studied here. An alternative stable ℋ∞ controller design method is also discussed
Keywords :
H∞ control; MIMO systems; Riccati equations; control system synthesis; linear systems; multidimensional systems; stability; state-space methods; ℋ∞ performance level; MIMO finite dimensional linear time invariant systems; algebraic Riccati equation; controller design method; positive semi-definite solution; stable ℋ∞ controllers; state space techniques; strong stabilization problem; sufficient condition; Control systems; Design methodology; Feedback; Interpolation; MIMO; Riccati equations; Stability; State-space methods; Sufficient conditions; Time invariant systems;
Conference_Titel :
Decision and Control, 1997., Proceedings of the 36th IEEE Conference on
Conference_Location :
San Diego, CA
Print_ISBN :
0-7803-4187-2
DOI :
10.1109/CDC.1997.649714
