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电力系统非线性振荡模态分析 被引量:8

Analysis of power system nonlinear oscillation modes
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摘要 利用Carleman线性化原理研究电力系统非线性振荡稳定性问题,通过分析得到了二阶及二阶以上电力系统动态方程解析解的表达式。通过Carleman线性化分析方法得到了系统的非线性高阶模态,可以用于研究电力系统的非线性动态特性及大干扰下系统的稳定性,揭示了非线性模态相关性对系统动态特性的影响。同时将线性模态参与因子的概念扩展到非线性模态中,定量地衡量各振荡模式之间的非线性相关作用。通过36节点系统的仿真计算与Prony分析结果进行了对比。通过Carleman线性化方法分析电力系统非线性模式之间的相互作用,可以在小干扰稳定和传统的线性化分析基础上更加深入地理解非线性系统的动态特性,为分析大干扰和强非线性情况下系统的稳定性和动态特性提供了一种新的手段。 The stability of power system with nonlinear oscillations is analyzed by using Carleman linearization theory.The explicit second order and high order solutions of the power system dynamics are obtained.The nonlinear high order modes of the system are calculated by Carleman linearization,which can be used to analyze the stability of the power system with large disturbances,as well as the nonlinear dynamical characteristics.Influences of the nonlinear mode correlations on the dynamical characteristics are studied.The concept of participation factor is extended from linear mode to nonlinear mode,and the interactions between different oscillation modes are evaluated.Epri-36 simulation results,compared with that of the Prony analysis,show the efficiency of the proposed method.By analyzing the interaction between nonlinear modes of power system through Carleman linearization theory,the dynamic characteristic of nonlinear system could be more clearly understood than small signal stability method and conventional linearized analysis.Carleman linearization theory provides a new method for studying the stability and the dynamic behavior under large disturbance and nonlinear condition.
作者 王宇静 于继来
机构地区 哈尔滨工业大学电气工程系
出处 《电力系统保护与控制》 EI CSCD 北大核心 2010年第20期1-5,11,共6页 Power System Protection and Control
基金 国家自然科学基金项目(50877014)~~
关键词 电力系统 低频振荡 Carleman线性化 非线性振荡 非线性相关 power system low frequency oscillation Carleman linearization nonlinear oscillation nonlinear interaction
分类号 TM712 [电气工程—电力系统及自动化]
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参考文献10

  • 1王铁强,贺仁睦,王卫国,徐东杰,魏立民,肖利民.电力系统低频振荡机理的研究[J].中国电机工程学报,2002,22(2):21-25. 被引量:205
  • 2Vittal V,Kliemann W,Ni Y X,et al.Determination of generator groupings for an islanding scheme in the Manitoba hydro system using the method of normal forms[J].IEEE Trans on Power Systems,1998,13(4):1345-1351.
  • 3Vittal V,Bhatia N,Fouad A A.Analysis of the inter-area mode phenomenon in power systems following large disturbances[J].IEEE Trans on Power Systems,1991,6(4):1515-1521.
  • 4Thapar J,Vittal V,Kliemann W,et al.Application of the normal form of vector fields to predict interarea separation in power systems[J].IEEE Trans on Power Systems,1997,12(2):844-850.
  • 5张靖,文劲宇,程时杰,何宇.基于向量场正规形的电力系统稳定模式相关性理论分析[J].中国电机工程学报,2006,26(11):82-86. 被引量:12
  • 6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):75-80. 被引量:24
  • 7Steeb W M,Wilhelm F.Nonlinear autonomous systems of differential equations and carleman linearization procedure[J].Journal of Mathematics and Applications,1980,77:601-611.
  • 8Al-Tuwaim M S,Crisalle O D,Svoronos S A.Discretization of nonlinear models using a modified varleman linearization technique[C].//The American Automatic Control Council.Proceeding of the 17th American Control Conference.Philadelphia(America):1998.
  • 9Arroyo J,Barocio E,Betancourt R,et al.A bilinear analysis technique for detection and quantification of nonlinear modal interaction in power systems[C].//IEEE Power Engineering Society.Proceeding of IEEE Power Engineering Society General Meeting.Montreal (Canada):2006.
  • 10肖晋宇,谢小荣,胡志祥,韩英铎.电力系统低频振荡在线辨识的改进Prony算法[J].清华大学学报(自然科学版),2004,44(7):883-887. 被引量:110

二级参考文献35

  • 1关根泰次 蒋建民(译).电力系统暂态解析论[M].北京:机械工业出版社,1989..
  • 2Wong D Y, Rogers G J, Pometta B, et al. Eigenvalue analysis of very large power systems [J]. IEEE Trans on Power Systems, 1988, 3: 472-480.
  • 3Sanchez-Gasca J J, Chow J H. Performance comparison of three identification methods for the analysis of electromechanical oscillation [J]. IEEE Trans on Power Systems, 1999, 14(3): 995-1002.
  • 4Hauer J F. Application of prony analysis to the determination of modal content and equivalent models for measured power system response [J]. IEEE Trans on Power Systems, 1991, 6(3): 1062-1068.
  • 5Kumaresan R, Tufts D W, Scharf L L. A prony method for noisy data: Choosing the signal components and selecting the order in exponential signal models [J]. Proc IEEE, 1984, 72(2): 230-233.
  • 6Trudnowski D J. Order reduction of large-scale linear oscillatory system models [J]. IEEE Trans on Power System, 1994, 9(1): 451-458.
  • 7Arrowsmith D K, Place C M. An introduction to dynamic systems[M].Cambridge University Press, Cambridge,1990.
  • 8Kahn P B, Zarmi Y. Nonlinear dynamics: Exploration through normal forms[C]. John Wiley&Sons.Inc.,1998.
  • 9Lin Chin Ming, Vittal V, Kliemann W H et al. Investigation of modal interaction and its effects on control performance in stressed power systems using normal forms of vector fields, in IEEE PES Summer Meeting[C]. 95 SM522-3, PWRS July 1995.
  • 10Jang G, Vittal V, Kliemann W. Effect of nonlinear modal interaction on control performance: use of normal forms technique in control design-part 1: general theory and procedure[J]. IEEE Transactions on Power Systems. 1998,13(2): 401-407.

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电力系统保护与控制
2010年 第20期

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