Dynamics of a minimal power system model - invariant tori and quasi-periodic motions

Author

Ji, Weijun ; Venkatasubramanian, Vaithianathan

Author_Institution

Sch. of Electr. Eng. & Comput. Sci., Washington State Univ., Pullman, WA, USA

Volume

2

fYear

1995

fDate

30 Apr-3 May 1995

Firstpage

1131

Abstract

The paper provides an extensive analysis of local and global bifurcation phenomena in studying the voltage-angle dynamic interactions of a minimal power system model. Using nonlinear analysis and normal form theory, it is proved that this system will experience quasi-periodic motions near certain degenerate local bifurcations which are explicitly characterized. The results in the paper provide strong analytical evidence for the possible occurrence of complicated behavior in the general power system from the interactions of voltage and angle instability mechanisms

Keywords

bifurcation; power system analysis computing; power system stability; angle instability; dynamics; global bifurcation; invariant tori; local bifurcation; minimal power system model; nonlinear analysis; normal form theory; quasi-periodic motions; voltage instability; voltage-angle interactions; Bifurcation; Damping; Equations; Power generation; Power system analysis computing; Power system dynamics; Power system modeling; Power transmission lines; State-space methods; Voltage;

fLanguage

English

Publisher

ieee

Conference_Titel

Circuits and Systems, 1995. ISCAS '95., 1995 IEEE International Symposium on

Conference_Location

Seattle, WA

Print_ISBN

0-7803-2570-2

Type

conf

DOI

10.1109/ISCAS.1995.521612

Filename

521612