Title :
Robust pole assignment for discrete interval systems
Author :
Ismail, O. ; Bandyopadhyay, B.
fDate :
30 Apr-3 May 1995
Abstract :
This note presents a method of designing the state feedback gain which places the closed-loop poles of a given discrete interval system inside some region. The Levy-Hadamard and Bendixson theorems have been used to derive algebraic relations which set bounds on the real and imaginary parts of the eigenvalues of the closed-loop system matrix. This helps in placing the closed-loop poles in a specified region, either inside a vertical strip, or inside a horizontal strip, or inside a rectangular region. It turns out that the relations are easily computable and the feedback gain can be determined in a very simple way. A numerical example illustrates the proposed procedure
Keywords :
closed loop systems; control system synthesis; discrete time systems; eigenvalues and eigenfunctions; pole assignment; robust control; state feedback; Bendixson theorem; Levy-Hadamard theorem; algebraic relations; closed-loop poles; closed-loop system matrix; discrete interval systems; eigenvalues; feedback controller design; horizontal strip; linear SISO system; numerical example; rectangular region; robust pole assignment; state feedback gain; vertical strip; Eigenvalues and eigenfunctions; Matrix decomposition; Robustness; State feedback;
Conference_Titel :
Circuits and Systems, 1995. ISCAS '95., 1995 IEEE International Symposium on
Conference_Location :
Seattle, WA
Print_ISBN :
0-7803-2570-2
DOI :
10.1109/ISCAS.1995.519882
