Title :
The minimal dimension of stable faces required to guarantee stability of a matrix polytope
Author :
Cobb, J. Daniel ; DeMarco, Christopher L.
Author_Institution :
Dept. of Electr. & Comput. Eng., Wisconsin Univ., Madison, WI, USA
fDate :
9/1/1989 12:00:00 AM
Abstract :
Considers the problem of determining whether each point in a polytope n×n matrices is stable. The approach is to check stability of certain faces of the polytope. For n⩾3, the authors show that stability of each point in every (2n-4)-dimensional face guarantees stability of the entire polytope. Furthermore, they prove that, for any k⩽n2, there exists a k-dimensional polytope containing a strictly unstable point and such that all its subpolytopes of dimension min {k-1,2n-5} are stable
Keywords :
matrix algebra; polynomials; stability criteria; eigenvalues; matrix algebra; matrix polytope; minimal dimension; stability; stable faces; unstable point; Eigenvalues and eigenfunctions; Polynomials; Robust control; Robust stability;
Journal_Title :
Automatic Control, IEEE Transactions on
