Power System Transient Stability Analysis: A Hamiltonian Approach

Sadatoshi KUMAGAI; Felix F. WU

Power System Transient Stability Analysis: A Hamiltonian Approach

Sadatoshi KUMAGAI, Felix F. WU

Full Text Views

0

Cite this

Summary :

A nonlinear dynamic circuit model is proposed to represent the differential-algebraic equations arising from the analysis of power system transient stability. By using the circuit-theoretic model, the following results are obtained. (1) Conditions are derived for the existence of Hamiltonian formulation of power systems. (2) A formula for calculating the critical reclosing time is derived using the Hamiltonian. (3) Conditions are obtained for the power system to reach synchronism asymptotically.

Publication: IEICE TRANSACTIONS on Fundamentals Vol.E74-A No.2 pp.259-269

Publication Date: 1991/02/25

Publicized

Online ISSN

DOI

Type of Manuscript: INVITED PAPER

Category

Authors

Sadatoshi KUMAGAI
Felix F. WU

Keyword

Cite this

Copy

Sadatoshi KUMAGAI, Felix F. WU, "Power System Transient Stability Analysis: A Hamiltonian Approach" in IEICE TRANSACTIONS on Fundamentals, vol. E74-A, no. 2, pp. 259-269, February 1991, doi: .
Abstract: A nonlinear dynamic circuit model is proposed to represent the differential-algebraic equations arising from the analysis of power system transient stability. By using the circuit-theoretic model, the following results are obtained. (1) Conditions are derived for the existence of Hamiltonian formulation of power systems. (2) A formula for calculating the critical reclosing time is derived using the Hamiltonian. (3) Conditions are obtained for the power system to reach synchronism asymptotically.
URL: https://global.ieice.org/en_transactions/fundamentals/10.1587/e74-a_2_259/_p

Copy

@ARTICLE{e74-a_2_259,
author={Sadatoshi KUMAGAI, Felix F. WU, },
journal={IEICE TRANSACTIONS on Fundamentals},
title={Power System Transient Stability Analysis: A Hamiltonian Approach},
year={1991},
volume={E74-A},
number={2},
pages={259-269},
abstract={A nonlinear dynamic circuit model is proposed to represent the differential-algebraic equations arising from the analysis of power system transient stability. By using the circuit-theoretic model, the following results are obtained. (1) Conditions are derived for the existence of Hamiltonian formulation of power systems. (2) A formula for calculating the critical reclosing time is derived using the Hamiltonian. (3) Conditions are obtained for the power system to reach synchronism asymptotically.},
keywords={},
doi={},
ISSN={},
month={February},}

Copy

TY - JOUR
TI - Power System Transient Stability Analysis: A Hamiltonian Approach
T2 - IEICE TRANSACTIONS on Fundamentals
SP - 259
EP - 269
AU - Sadatoshi KUMAGAI
AU - Felix F. WU
PY - 1991
DO -
JO - IEICE TRANSACTIONS on Fundamentals
SN -
VL - E74-A
IS - 2
JA - IEICE TRANSACTIONS on Fundamentals
Y1 - February 1991
AB - A nonlinear dynamic circuit model is proposed to represent the differential-algebraic equations arising from the analysis of power system transient stability. By using the circuit-theoretic model, the following results are obtained. (1) Conditions are derived for the existence of Hamiltonian formulation of power systems. (2) A formula for calculating the critical reclosing time is derived using the Hamiltonian. (3) Conditions are obtained for the power system to reach synchronism asymptotically.
ER -