基于正则形理论的非线性稳定因子

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摘要在正则形二阶变换基础上, 通过研究变换过程中省略的交叉项和省略的三阶项, 提出了分析大扰动下电力系统稳定的非线性稳定因子的新概念, 即阻尼因子和稳定域因子的新概念。通过阻尼因子可分析大扰动下正则形变量幅值发生变化的快慢, 在此基础上再通过稳定域因子的计算得到大扰动下正则形变量稳定的区域, 进而判断系统稳定情况。这些稳定信息是无法从以往的分析理论和方法中得到的, 这从另一侧面为系统的稳定分析提供了一条可行途径。电力系统算例仿真结果证明了本文所提出非线性稳定因子这一新概念的正确性和在电力系统中应用的有效性。

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	邓集祥
	姜涛
	姜传霏
	欧小高

关键词 ：电力系统稳定, 非线性稳定因子, 正则形二阶变换, 低频振荡模式, 时域仿真

Abstract：A new concept called as non-linear stability factor which can be used to analyze power system stability under large disturbance is first proposed in this paper by researching the transform process of abridged cross-term and third order-term in normal form second-order transformation. That is damping factor and stability domain factor. The variation speeds of normal form variable amplitude under large disturbance can be analyzed by damping factor. On this basis, normal form variable stability domain under large disturbance can be acquired by calculating the stability domain factor, and then judging the system stability. These information of stability cannot be obtained from the existing analysis theory and method, so it provides a feasible approach to analysis the system stability by using another point of view. Simulation results of an example prove the correctness and effectiveness of the proposed concept.

Key words： Power system stability nonlinear stability factor normal form second-order transformation inertial mode time-domain simulation

收稿日期: 2008-10-24 出版日期: 2014-12-12

PACS:

TM712

作者简介: 邓集祥男, 1947年生, 博士, 教授, 研究方向为电力系统稳定与控制, 配电自动化。姜涛男, 1982年生, 硕士, 研究方向为电力系统稳定分析与控制。

引用本文:

邓集祥, 姜涛, 姜传霏, 欧小高. 基于正则形理论的非线性稳定因子[J]. 电工技术学报, 2010, 25(2): 134-138. Deng Jixiang, Jiang Tao, Jiang Chuanfei, Ou Xiaogao. Nonlinear Stability Indexes Based on Normal-Form Theory. Transactions of China Electrotechnical Society, 2010, 25(2): 134-138.

链接本文:

http://dgjsxb.ces-transaction.com/CN/Y2010/V25/I2/134

[1] Dobson I, Barocio E. Scaling of normal form analysis coefficients under coordinate change[J]. IEEE Trans. on Power Syst., 2004, 19(3): 1438-1444.
[2] Zhu S Z, Vitta V, Kliemann W. Analyzing dynamic performance of power systems over parameter space using normal forms of vector fields part I: Identification of vulnerable regions[J]. IEEE Trans. on Power Systems, 2001, 16(4): 444-450.
[3] Saha S, Fouad A A, Kliemann W. Stability boundary approximation of a power system using the real normal form of vector fields[J]. IEEE Trans. on Power Syst., 2005, 12: 797-802.
[4] Starrett S K, Fouad A A. Nonlinear measures of mode-machine participation[J]. IEEE Trans. on Power Syst., 1998, 13(2): 389-394.
[5] 李伟固. 正则形理论及其应用[M]. 北京: 科学出版社, 2000.
[6] 邓集祥, 陈武晖, 纪静. 基于正则形理论的电力系统2阶模态谐振的研究[J]. 中国电机工程学报, 2006, 26(24): 5-11.
[7] Jang G, Vittal V, Kliemann W. Effect of nonlinear modal interaction on control performance use of normal forms technique in control design. Part Ⅰ: General theory and procedure[J]. IEEE Trans. on Power Syst., 1998, 13(2): 401-407.
[8] Sanchez Gasca J J, Vittal V, Gibbard M J, et al. Committee report-task force on assessing the need to
include higher order terms for small-signal (modal) analysis[J]. IEEE Trans. on Power Syst. , 2005, 20(4): 1886-1904.
[9] Betancourt R J, Barocio E, Arroyo J, et al. A real normal form approach to the study of resonant power systems[J]. IEEE Trans. on Power Syst., 2006, 21(1): 431-432.
[10] Guckenheimer J, Holmes P. Nonlinear oscillations, dynamical systems and bifurcations of vector fields[M]. New York: Springer-Verlag, 1990.
[11] Kumano T. Nonlinear stability indexes of power swing oscillation using normal form analysis[J]. IEEE Trans. on Power Syst. , 2006, 20(2): 1439-1448.
[12] 邓集祥, 赵丽丽. 主导低频振荡模式二阶非线性相关作用的研究[J]. 中国电机工程学报, 2005, 25(7): 15-21.