Title :
Hurwitz Stability of Metzler Matrices
Author :
Narendra, Kumpati S. ; Shorten, Robert
Author_Institution :
Center for Syst. Sci., Yale Univ., New Haven, CT, USA
fDate :
6/1/2010 12:00:00 AM
Abstract :
In this note, a simple method is presented that is both necessary and sufficient for determining whether a given Metzler matrix A is Hurwitz. The method is based on the well known fact that a Hurwitz Metzler matrix is also diagonally stable. By using this fact, very simple conditions are derived for the Hurwitz stability of a Metzler matrix. The conditions are stated in terms of the signs of the diagonal entries of a sequence of lower dimensional matrices. The efficacy of the conditions is demonstrated by applying them to determine stability in several examples.
Keywords :
linear systems; matrix algebra; stability; Hurwitz Metzler matrix; Hurwitz stability; diagonal stability; linear systems stability; lower dimensional matrices; positive linear systems; Communication networks; Distributed control; Eigenvalues and eigenfunctions; Linear systems; Logic testing; Lyapunov method; Permission; Sequences; Stability; Sufficient conditions; Symmetric matrices; Testing; Diagonal stability; positive linear systems; stability of linear systems;
Journal_Title :
Automatic Control, IEEE Transactions on
DOI :
10.1109/TAC.2010.2045694
