Title :
A characterization of the Hurwitz stability of Metzler matrices
Author :
Narendra, Kumpati S. ; Shorten, Robert
Author_Institution :
Center for Syst. Sci., Yale Univ., New Haven, CT, USA
Abstract :
It is well known that a Hurwitz Metzler matrix is also diagonally stable. We obtain a necessary and sufficient condition for a matrix A to be diagonally stable from the Kalman-Yacubovich-Popov lemma. This condition is equivalent to requiring that a pair of LTI systems, of lower dimension, have a common Lyapunov function. This fact is made use of to derive very simple conditions for the Hurwitz stability of a Metzler matrix. These conditions are stated in terms of the signs of the diagonal entries of a sequence of lower dimensional matrices that are easily constructed.
Keywords :
Lyapunov methods; matrix algebra; stability; Hurwitz stability; Lyapunov function; Metzler matrices; lower dimensional matrices; Differential equations; Eigenvalues and eigenfunctions; Lyapunov method; Stability; Sufficient conditions; Symmetric matrices; Testing;
Conference_Titel :
American Control Conference, 2009. ACC '09.
Conference_Location :
St. Louis, MO
Print_ISBN :
978-1-4244-4523-3
Electronic_ISBN :
0743-1619
DOI :
10.1109/ACC.2009.5160435
