Title :
LMI stability condition for linear systems with generalized frequency variables
Author :
Tanaka, Hideaki ; Hara, Shinji ; Iwasaki, Tetsuya
Author_Institution :
Dept. of Inf. Phys. & Comput., Univ. of Tokyo, Tokyo, Japan
Abstract :
A class of large-scale systems with decentralized information structures such as multi-agent systems can be represented by a linear system with a generalized frequency variable. In this paper, we investigate stability of such systems, which is the most fundamental property from the view point of control. Specifically, we first present a systematic way of deriving a Hurwitz type stability criterion and then show that it can be reduced to a linear matrix inequality (LMI) feasibility problem involving generalized Lyapunov inequalities. Furthermore, the properties of the LMI stability condition are examined, and they are confirmed by numerical examples.
Keywords :
Lyapunov methods; continuous time systems; decentralised control; linear matrix inequalities; linear systems; multi-agent systems; stability criteria; Hurwitz type stability criterion; LMI stability condition; Lyapunov inequality; decentralized information structure; generalized frequency variable; large-scale system; linear matrix inequality; linear system; multi-agent system; time invariant system; Control systems; Frequency; Large-scale systems; Linear matrix inequalities; Linear systems; Multiagent systems; Robust stability; Stability analysis; Stability criteria; Transfer functions;
Conference_Titel :
Asian Control Conference, 2009. ASCC 2009. 7th
Conference_Location :
Hong Kong
Print_ISBN :
978-89-956056-2-2
Electronic_ISBN :
978-89-956056-9-1
