Title :
Nonlinear analysis of a single-machine-quasi-infinite-busbar system
Author :
Hamdan, A.M.A. ; Nayfeh, M.A. ; Nayfeh, A.H.
Author_Institution :
Dept. of Eng. Sci. & Mech., Virginia Polytech. & State Univ., Blacksburg, VA, USA
Abstract :
The response of a single-machine-quasi-infinite busbar system to the simultaneous occurrence of principal parametric resonance and subharmonic resonance of order one-half is investigated. By decreasing the frequency of excitation, it is shown that oscillatory solutions (limit-cycles) lose their stability through a series of period-doubling bifurcations leading to chaos and unbounded motions (pole-slippage). A second-order approximate solution that improves on the accuracy of the solution given by A.M.A. Hamdan and A.H. Nayfeh (Trans. on Power Systems, vol.4, p.843-9, 1989) is described. The solution accounts for the frequency shift caused by the excitation. The loss of stability of the second-order solution, which is a precursor to chaos and unbounded motions, agrees fairly well with the numerical simulations
Keywords :
busbars; power systems; resonance; chaos; excitation frequency; frequency shift; limit-cycles; nonlinear analysis; oscillatory solutions; period-doubling bifurcations; pole-slippage; power systems; principal parametric resonance; second-order approximate solution; single-machine-quasi-infinite-busbar system; stability; subharmonic resonance; unbounded motions; Bifurcation; Chaos; Equations; Frequency; Numerical simulation; Perturbation methods; Power system analysis computing; Power system dynamics; Power system stability; Resonance;
Conference_Titel :
Southeastcon '90. Proceedings., IEEE
Conference_Location :
New Orleans, LA
DOI :
10.1109/SECON.1990.117789
