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时滞动力系统的α-稳定性分析 被引量:3

Analysis of α-Stability of Dynamical System with Time Delay
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摘要 摘要:通过引入一个α因子,把参数与时滞无关的时滞系统转变为参数与时滞相关的时滞系统,进而利用Beretta和Kuang文中的公式Sj=τ-jτ及其结论,分析讨论了带一个时滞的时滞微分方程零解的快速收敛,即α-稳定性问题.零解的时间历程图表明结果是有效的. By introducing an α- factor, time delay system in which the parameters were irrelevant to time delay was transformed to a system in which the parameters had something to do with time delay. Then, through the use of the formula Sj=τ-τj and the conclusion of Beretta and Kuang, this paper examined the rapid convergence of zero solution to delay differential equations, i.e. α-stability problem. Zero solution's time course chart proved to be effective.
作者 狄成宽
机构地区 南京工程学院基础部
出处 《南京工程学院学报(自然科学版)》 2008年第3期1-6,共6页 Journal of Nanjing Institute of Technology(Natural Science Edition)
关键词 时滞 特征方程 稳定性切换 α-稳定性 time delay characteristic equation stability switches α-stability
分类号 O175 [理学—基础数学]
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参考文献12

  • 1[1]MORI T,NOLDUS E,KUWAHARA M.A way to stabilize linear systems with decayed state[J].Aut-omatiea,1983,19:571-572,
  • 2[2]MORI T,FUKUMA M,KUWAHARA M.On an estimate of the decay rate for stable linear delay systems[J],Int J Control,1982,36:95-97.
  • 3[3]HMAMED A.Comments on "On an estimate of the delay rate for stable linear delay system"[J].Int J Control,1985,42 (2):539-540.
  • 4[4]MORI T.Further comments on "On an estimate of the decay rate for stable linear delay system"[J].Int J Control,1986,43 (5):1613-1614.
  • 5[5]BOURLES H.α-stability of systems governed by a functional equationwextension of results concerning linear delay systems[J].Int J Control,1987,45(6):2233-2234.
  • 6[6]BOURLES H.α-stability and robustness of large-scale interconnected systems[J],Int J Control,1987,45(6):2221-2232.
  • 7[7]WANG R J,WANG W J.α-stability analysis of rertubed systems with multiple noncommensurate time delays[J].IEEE Transactions on Circuits and Systems-1:Fundamental Theory and Applications,1996,43(4):349-352.
  • 8[8]WANG Z H,HU H Y.Stability switches of time-delayed dynamic systems with unknown param-eters[J].Join'hal of Sound and Vibration 2000,233(2):215-233.
  • 9[9]HU H Y,DOWELL E H.Resonance of harmonically forced duffing oscillator with delay state feedback[J].Nonlinear Dynamics,1998,15:311-327.
  • 10[10]BERETTA E,KUANG Y.Geometric stability switches criteria in delay differential systems with delay dependent parameters[J],SIAM J Math Anal,2002,33:1144-1165.

同被引文献16

  • 1王京祥,王在华.时滞状态反馈控制系统的稳定性增益区域[J].动力学与控制学报,2008,6(4):301-306. 被引量:8
  • 2马苏奇,陆启韶.具有非线性出生率的时滞Lasota-Wazewska模型的稳定性分岔[J].南京师大学报(自然科学版),2005,28(2):1-5. 被引量:4
  • 3Jianquan LI,Zhien MA.ULTIMATE STABILITY OF A TYPE OF CHARACTERISTIC EQUATION WITH DELAY DEPENDENT PARAMETERS[J].Journal of Systems Science & Complexity,2006,19(1):137-144. 被引量:4
  • 4Hu H Y, Wang Z H. Dynamics of controlled mechanical systems with delayed feedback. Berlin :Springer-Verlag, 2002.
  • 5Huang L. Fundamentals of stability and robustness. Beijing : Science Press, 2003.
  • 6Wang Z B, Ha H Y, Wang H L. Robust stabilization to non-linear delayed systems via delayed state feedback: the averaging method. Journal of Sound and Vibration ,2005, 279:937 - 953.
  • 7Mori T, Noldus E, Kuwahara M. A way to stabilize linear systems with decayed state . Automatiea, 1983, 19:571 - 572.
  • 8Moil T, Fukuma M, Kuwahara M. On an estimate of the decay rate for stable linear delay Systems. Int. J. Control,1982, 36:95.
  • 9Beretta E, Kuang Y. Geometric stability switches criteria in delay differential systems with delay dependent parameters. SLAM. J. Math. Anal, 2002, 33 : 1144 - 1165.
  • 10Shinozaki H, Mori T. Robust stability analysis of linear time-delay systems by Lambert W function: Some extreme point results. Automatica, 2006, 42: 1791 - 1799.

引证文献3

二级引证文献3

南京工程学院学报(自然科学版)
2008年 第3期

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