Geometric structure of generalized controlled Hamiltonian systems and its application 被引量：15

Geometric structure of generalized controlled Hamiltonian systems and its application

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摘要 The main purpose of this paper is to provide a systematic geometric frame for generalized controlled Hamiltonian systems. The pseudo-Poisson manifold and the ω-manifold are proposed as the statespace of the generalized controlled Hamiltonian systems. A Lie group, calledN-group, and its Lie algebra, calledN-algebra, are introduced for the structure analysis of the systems. Some properties, including spectrum, structure-preservation, etc. are investigated. As an example the theoretical results are applied to power systems. The stabilization of excitation systems is investigated.

作者程代展席在荣卢强梅生伟

机构地区 Laboratory of Systems and Control Department of Electrical Engineering

出处《Science China(Technological Sciences)》 SCIE EI CAS 2000年第4期365-379,共15页 中国科学（技术科学英文版）

关键词 generalized HAMILTONIAN system SYMPLECTIC GEOMETRY SYMPLECTIC group POISSON BRACKET excita-tion control. generalized Hamiltonian system symplectic geometry symplectic group Poisson bracket excitation control

分类号 O231 [理学—运筹学与控制论]

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参考文献3

1Sarlashkar,J. V.Hamilton/Lagrange formalisms in stability analysis of detailed power system models, Ph D Thesis, Univ[]..1996
2Boothby,W. M.Introduction to Differentiable Manifolds and Riemannian Geometry, 2nd ed[]..1986
3Wang,D.Some aspects of Hamiltonian systems and symplectic algorithms[].Journal of Physics D Applied Physics.1994

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2R DUNN.Effect of embedded voltage source converter on power system oscillation damping[J].Science China(Technological Sciences),2010,53(4):892-901. 被引量：10
3WU ShengYu,MEI ShengWei & ZHANG XueMin State Key Laboratory of Power Systems,Department of Electrical Engineering,Tsinghua University,Beijing 100084,China.Estimation of LISS(local input-to-state stability) properties for nonlinear systems[J].Science China(Technological Sciences),2010,53(4):909-917. 被引量：13
4YUAN Ye1,2,SUN YuanZhang2,CHENG Lin2,CHEN Gang2 & WANG Peng3 1 State Nuclear Electric Power Planning Design and Research Institute,Beijing 100032,China,2 State Key Laboratory of Power Systems,Deptment of Electrical Engineering,Tsinghua University,Beijing 100084,China,3 EEE School,Nanyang Technological University,Singapore.Power system low frequency oscillation monitoring and analysis based on multi-signal online identification[J].Science China(Technological Sciences),2010,53(9):2589-2596. 被引量：13
5王玉振,葛树志,程代展.广义Hamilton系统的观测器及基于观测器的H_∞控制设计[J].中国科学（E辑）,2004,34(12):1313-1328. 被引量：6
6毛承雄,陆继明,樊俊.电力系统动态仿真的新模型[J].电力系统及其自动化学报,1996,8(1):1-7. 被引量：4
7王海亮,于海生.异步电动机哈密顿控制系统的建模与仿真[J].青岛大学学报（工程技术版）,2006,21(1):33-38. 被引量：7
8LIU Yanhong,LI Chunwen,WU Rebing.Feedback control of nonlinear differential algebraic systems using Hamiltonian function method[J].Science in China(Series F),2006,49(4):436-445. 被引量：10
9刘孙贤,张敏,钟义长,朱承志.基于Hamilton能量函数含SVC的电力系统非线性控制[J].电力系统及其自动化学报,2006,18(4):24-28. 被引量：6
10顾丽鸿,王杰.STATCOM与发电机励磁非线性控制器设计[J].华东电力,2006,34(9):1-5. 被引量：3

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2朱礼营,王玉振.切换耗散Hamilton系统的稳定性研究[J].中国科学（E辑）,2006,36(6):617-630. 被引量：3
3刘孙贤,张敏,钟义长,朱承志.基于Hamilton能量函数含SVC的电力系统非线性控制[J].电力系统及其自动化学报,2006,18(4):24-28. 被引量：6
4李健勇,刘艳红,李春文.非线性微分代数系统耗散Hamilton实现的几个注解[J].郑州轻工业学院学报（自然科学版）,2007,22(1):55-59.
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7朱礼营,王玉振.混杂切换Hamilton系统的H_∞控制[J].控制与决策,2007,22(8):956-960. 被引量：1
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1赵晓华,李继彬,黄克累.HOMOCLINIC　ORBITS　IN　PERTURBED　GENERALIZED　HAMILTONIAN　SYSTEMS[J].Acta Mathematica Scientia,1996,16(4):361-374. 被引量：1
2梅凤翔.Poisson's theory of Birkhoffian system[J].Chinese Science Bulletin,1996,41(8):641-645. 被引量：7
3高普云.NEW METHOD FOR THE CONSTRUCTION OF INTEGRABLE HAMILTONIAN SYSTEMS[J].Applied Mathematics and Mechanics(English Edition),1996,17(10):993-998.
4吴宁,阮图南.Hamiltonian formulation of generalized quantum dynamics——Quantum mechanical problem[J].Science China Mathematics,1997,40(4):417-421.
5郭仲衡,陈玉明.The Hamiltonian Structures of 3D ODE with Time-Independent Invariants[J].Applied Mathematics and Mechanics(English Edition),1995,16(4):301-306.
6李起升.Kauffman polynomials of some links and invariants of 3-manifolds[J].Science China Mathematics,2002,45(5):604-609.
7Ning ZHANG~(1+) Hong-bo LI~2 1 China Institute for Actuarial Science (CIAS),Central University of Finance and Economics,Beijing 100081,China,2 Academy of Mathematics and Systems Science,Chinese Academy Sciences,Beijing 100080,China.Affine bracket algebra theory and algorithms and their applications in mechanical theorem proving[J].Science China Mathematics,2007,50(7):941-950. 被引量：1
8HUANG Lei,LI HongBo.Complex brackets and balanced complex 1st-order difference polynomials in 4-dimensional Minkowski space[J].Science China Mathematics,2008,51(12):2137-2148. 被引量：1
9Eugene Tyrtyshnikov.Preservation of Linear Constraints in Approximation of Tensors[J].Numerical Mathematics(Theory,Methods and Applications),2009,2(4):421-426.
10WANG Feng-xiao.Preservation Property of NBUCA Life Distributions[J].Chinese Quarterly Journal of Mathematics,2015,30(2):206-210. 被引量：3

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Geometric structure of generalized controlled Hamiltonian systems and its application 被引量：15

参考文献3

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二级引证文献57

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