Title :
Stability conditions for polytopes of polynomials
Author_Institution :
Div. of Optimization & Syst. Theory, R. Inst. of Technol., Stockholm, Sweden
Abstract :
The stability of linear systems with uncertain parameters is addressed. The author treats the mathematical problem of deciding whether or not all polynomials in some specified family are Ω-stable (have all their zeros in the subset Ω of the complex plane). For a general stability region in the complex plane, a stability criterion for polytopes of polynomials is given in terms of the stability of a minimal number of corners and edges of the polytope. The ´testing set´ of edges and corners depends entirely on the edge directions of the polytope, hence the results are particularly applicable when the directions are fixed, but the lengths and positions of the edges are allowed to vary. Applications to robust pole placement of uncertain systems and computation of worst case H∞ norms are demonstrated
Keywords :
linear systems; poles and zeros; polynomials; stability criteria; Ω-stable; general stability region; linear systems; polynomials; robust pole placement; stability criterion; uncertain systems; worst case H∞ norms; Computer applications; Ear; Polynomials; Robustness; Stability analysis; Stability criteria; State feedback; Testing; Transfer functions; Uncertain systems;
Conference_Titel :
Decision and Control, 1990., Proceedings of the 29th IEEE Conference on
Conference_Location :
Honolulu, HI
DOI :
10.1109/CDC.1990.203539
