Title :
Stability robustness computation of quasipolynomials with affine coefficient perturbations
Author :
Hu, Guangdi ; Davison, Edward J.
Author_Institution :
Dept. of Electr. & Comput. Eng., Toronto Univ., Ont., Canada
Abstract :
This paper considers the problem of the stability robustness computation of quasipolynomials with coefficients which are affine functions of the parameter perturbations. A quasipolynomial is said to be stable if its roots are contained in an arbitrarily pre-specified open set in the complex plane, and its stability robustness is then measured by the norm of the smallest parameter perturbation which destabilizes the quasipolynomial. A simple and numerically effective procedure, which is based on the Hahn-Banach theorem of convex analysis, and which is applicable for any arbitrary norm, is obtained to compute the stability robustness. The computation is then further simplified for the case when the norm used is the Holder ∞-norm, 2-norm or 1-norm
Keywords :
perturbation techniques; polynomials; robust control; Hahn-Banach theorem; Holder ∞-norm; Holder 1-norm; Holder 2-norm; affine coefficient perturbations; affine functions; arbitrary norm; convex analysis; destabilization; parameter perturbations; pre-specified open set; quasipolynomials; smallest parameter perturbation; stability robustness computation; Asymptotic stability; Delay; Educational institutions; Power engineering computing; Robust stability; Stability analysis; Strips;
Conference_Titel :
American Control Conference, 2000. Proceedings of the 2000
Conference_Location :
Chicago, IL
Print_ISBN :
0-7803-5519-9
DOI :
10.1109/ACC.2000.879178
