Title :
A stability condition for a time-varying system represented by a couple of a second- and a first-order differential equations
Author :
Inoue, Kaoru ; Kato, Toshiji
Author_Institution :
Dept. of Electr. Eng., Doshisha Univ., Kyoto, Japan
Abstract :
In this paper, we analyze stability of a time-varying system represented by a second-order vector differential equation based on the characteristics of its coefficient matrices. The objective system has a singular coefficient matrix M(t), so the system is composed by a couple of a second- and a first-order vector differential equations. New sufficient conditions for asymptotic stability of the equilibrium points are derived. We also discuss the relations between our result and that for time-invariant system, and that for non-singular coefficient matrix M(t).
Keywords :
control system analysis; differential equations; matrix algebra; stability; time-varying systems; asymptotic stability; equilibrium points; first-order differential equations; second-order differential equations; singular coefficient matrix; stability analysis; stability condition; time-varying system; vector differential equation; Asymptotic stability; Damping; Differential equations; Parameter estimation; Robustness; Stability analysis; Sufficient conditions; Symmetric matrices; Time varying systems;
Conference_Titel :
Decision and Control, 2004. CDC. 43rd IEEE Conference on
Print_ISBN :
0-7803-8682-5
DOI :
10.1109/CDC.2004.1428912
