Title :
The stability robustness of generalized eigenvalues
Author :
Qiu, L. ; Davison, E.J.
Author_Institution :
Dept. of Electr. Eng., Toronto Univ., Ont., Canada
fDate :
6/1/1992 12:00:00 AM
Abstract :
The concept of stability radius is generalized to matrix pairs. A matrix pair is said to be stable if its generalized eigenvalues are located in the open left half of the complex plane. The stability radius of a matrix pair (A, B) is defined to be the norm of the smallest perturbation ΔA such that (A+ΔA, B) is unstable. The purpose is to estimate the stability radius of a given matrix pair. Depending on whether the matrices under consideration are complex or real, the problem can be classified into two cases. The complex case is easy and a complete solution is provided. The real case is more difficult, and only a partial solution is given
Keywords :
eigenvalues and eigenfunctions; matrix algebra; stability criteria; complex plane; generalized eigenvalues; matrix pairs; robustness; stability radius; Councils; Eigenvalues and eigenfunctions; Matrix decomposition; Pathology; Polynomials; Robust stability; Singular value decomposition; Stability analysis; State estimation; Uncertainty;
Journal_Title :
Automatic Control, IEEE Transactions on
