DocumentCode
891833
Title
Lagrange-Charpit method and stability problem of power systems
Author
Miyagi, H. ; Taniguchi, T.
Author_Institution
Ryukyu University, Department of Electrical Engineering, Nishihara, Japan
Volume
128
Issue
3
fYear
1981
fDate
5/1/1981 12:00:00 AM
Firstpage
117
Lastpage
122
Abstract
The paper applies the Lagrange-Charpit method to construct a Lyapunov function for stability studies of power systems. The Lyapunov function is given for the single-machine system taking into account saliency and the effect of variable damping. The stability boundary obtained is compared with those obtained by conventional Lyapunov functions and the true stability boundary. It is shown that the application of the Lagrange-Charpit method results in considerable improvement of stability-boundary estimates over those which have been currently available concerning this problem. Another model including the effects of constant damping and the velocity governor with one time constant is also studied. In this 3rd-order system, cross-sections of the stability surface for various planes are given, showing the superiority of the proposed Lyapunov function.
Keywords
Lyapunov methods; damping; power systems; stability; 3rd-order system; Lagrange-Charpit method; Lyapunov function; constant damping; power systems; saliency; single-machine system; stability; time constant; variable damping; velocity governor;
fLanguage
English
Journal_Title
Control Theory and Applications, IEE Proceedings D
Publisher
iet
ISSN
0143-7054
Type
jour
DOI
10.1049/ip-d.1981.0021
Filename
4642048
Link To Document