期刊文献+
任意字段
题名或关键词
题名
关键词
文摘
作者
第一作者
机构
刊名
分类号
参考文献
作者简介
基金资助
栏目信息

非线性电路系统动力学的研究进展及展望 被引量:3

Development and prospect of nonlinear dynamics in electrical system
下载PDF
导出
摘要 介绍了非线性电路系统动力学几十年来的研究状况,重点阐述了几类典型的非线性电路,如蔡氏电路、"Jerk"电路和DC-DC变换器的研究进展。概括了非线性电路理论分析、数值模拟以及实验研究的主要方法,对目前非线性电路工作中的存在的一些问题和研究趋势进行了展望。 The research status in nonlinear electric circuit in the last decades is briefly introduced, and the developments of several classes of typical nonlinear circuits, such as Chau's circuit, "jerk" circuit as well as DC-DC converter are reviewed. Main methods for theoretical analysis, numerical simulation and experimental study are presented and the existed problems as well as the trends for nonlinear circuits are proposed for furture investigation.
作者 张晓芳 陈章耀 毕勤胜
机构地区 江苏大学土木工程与力学学院
出处 《电路与系统学报》 CSCD 北大核心 2012年第5期124-129,共6页 Journal of Circuits and Systems
基金 国家自然科学基金(10872080 20976075) 江苏大学高级人才基金(10JDG144)
关键词 非线性电路 分岔 混沌 动力学特性 nonlinear electric circuit, bifurcation, chaos, dynamical property
分类号 TN711 [电子电信—电路与系统]
  • 相关文献

参考文献25

  • 1Shil'nikov L P. Chua's Circuit: Rigorous Results and Future Problems [J]. IEEE Transactions on Circuits and System- I: Fundamental Theory and Applications, 1993, 40(10): 784-786.
  • 2Koliopanos C L, Kyprianidis I M, Stouboulos I N, et al. Chaotic behaviour of a fourth-order autonomous electric circuit. Chaos, Solitons & Fractals, 2003, 16(2): 173-182.
  • 3Hartley T T, Mossayebi F. The duffing double scroll [A]. Proceedings of the American Control Conference [C]. Pittsburgh: 1989. 419-423.
  • 4禹思敏,吕金虎.高阶蔡氏电路及其FPGA实现[D].第26届中国控制会议论文集,北京航空航天大学出版社,2007.409-413.
  • 5Sprott J C. A new class of chaotic circuit [J]. Physics Letter A, 2000, 266(1): 19-23.
  • 6Huang Y, Yang X S. Horseshoes in a class of simple circuits [J]. Chaos, Solltons & Fractals, 2006, 29(1): 131-140.
  • 7Ziya P N, Hacinliyan A. Normal forms and nonlocal chaotic behavior in Sprott systems [J]. International Journal of Engineering Science, 2003, 41(10): 1085-1108.
  • 8Deane J H B, Hamill D C. Instability, subharmonics and chaos in power sleetronics systems [A]. IEEE Power Electronics Specialists Conference [C]. 1989:34-42.
  • 9Yuan G, Banerjee S, Ott E. Border-collision bifurcations in the buck converter [J]. IEEE Transactions on Circuits and System- I: Fundamental Theory and Applications, 1998, 45(7): 707-716.
  • 10罗晓曙,汪秉宏,陈关荣,全宏俊,方锦清,邹艳丽,蒋品群.DC-DC buck变换器的分岔行为及混沌控制研究[J].物理学报,2003,52(1):12-17. 被引量:54

二级参考文献11

  • 1Lorenz E N.Deterministic nonperiodic flow[J].J.Atmos Sci.,1963,20:130-141.
  • 2Chen G Ueta T.Yet another chaotic attractor[J].Int.J.Bifurcation and Chaos,1999,9:1465-1466.
  • 3Ln J,Chen G.A new chaotic attractor coined[J].Int.J.Bifurcation and Chaos,2002,12:659-661.
  • 4Liu C,Liu T,Liu L,et al.A new chaotic attractor[J]Chaos,Solitons and Fractals,2004,22:103l-1038.
  • 5Jing Z,Chang Y,Chen G,Complex dynamics in a permanent·magnet synchronous motor model[J].Chaos,Solitons and Fractals,2004,22:831.848.
  • 6Silva C,Si'Inikov theorem-a tutorial[J].IEEE Transactions on Circuits and Systems I.1993,40:678-682.
  • 7Zhou T,Chen G,Yang O.Constructing a new chaotic system based in the Si'Inikov criterion[J]Chaos,Solitions&Fraetals,2004,12:985.993.
  • 8王光义,丘水生,陈辉,崔佳冬.一个新的混沌系统及其电路设计与实现[J].电路与系统学报,2008,13(5):58-60. 被引量:11
  • 9方锦清,高远,翁甲强,罗晓曙,陈关荣.小波函数反馈法实现对强流束晕混沌的有效控制[J].物理学报,2001,50(3):435-439. 被引量:41
  • 10张家树,肖先赐.基于广义混沌映射切换的混沌同步保密通信[J].物理学报,2001,50(11):2121-2125. 被引量:60

共引文献102

同被引文献37

  • 1丰建文,吴耿,张维强,何玲.滑模控制实现噪声干扰超陈混沌系统同步研究[J].深圳大学学报(理工版),2009,26(1):36-41. 被引量:3
  • 2王发强,刘崇新.新的变形蔡氏电路及实验[J].通信学报,2006,27(9):102-105. 被引量:4
  • 3徐兴磊,李红.压缩真空态的激发态下介观串并联RLC电路的量子涨落[J].郑州大学学报(理学版),2007,39(1):67-70. 被引量:10
  • 4董恩增,陈增强,袁著祉.基于神经网络PID控制器的混沌系统控制与同步[J].吉林大学学报(工学版),2007,37(3):646-650. 被引量:7
  • 5E1 Guezar F, Bouzahir H. Chaotic behavior in a switched dynamical system [ J ]. Modelling and Simulation in En- gineering, 2008, 2008: 798395-1-798395-6.
  • 6EI Aroudi A, Debbat M, Giral R, et al. Bifurcation in DC-DC switching converters : review of methods and appli- cations [ J ]. International Journal of Bifurcation and Chaos in Applied Sciences and Engineering, 2005, 15 (5) : 1549-1578.
  • 7Chang W D, Yan J J. Adaptive robust PID controller de- sign based on a sliding mode for uncertain chaotic systems [J]. Chao, Solitons & Fractals, 2005, 26 (1) : 167- 175.
  • 8Chang H C, Chen L H. Bifurcation characteristics of non- linear systems under conventional PID control [ J ]. Chemical Engineering Science, 1984, 39 (7/8) : 1127- 1142.
  • 9Chang W D. PID control for chaotic synchronization using particle swarm optimization [ J 1- Chaos, Solitons & Fractals, 2009, 39 (2): 910-917.
  • 10Kennedy J, Eberhart R. Particle swarm optimization [ C ]// Proceedings of IEEE International Conference on Neural Networks: IV. Piscataway (USA) : IEEE Service Center, 1995: 1942-1948.

引证文献3

二级引证文献1

电路与系统学报
2012年 第5期

相关作者

内容加载中请稍等...

相关机构

内容加载中请稍等...

相关主题

内容加载中请稍等...

浏览历史

内容加载中请稍等...
;
使用帮助 返回顶部