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具有任意激活函数的时延神经元方程的Hopf分岔 被引量:1

HOPF BIFURCATION FOR DELAYED NEURON EQUATION WITH ARBITRARY ACTIVATION FUNCTION
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摘要 该文研究了一个带时延的神经元方程,分析相应的线性化方程的超越特征方程,研究了这个模型的线性稳定性,对于神经元来自过去状态的抑制影响,作者发现当这个影响值变化并通过一个临界序列时,这个模型会出现Hopf分岔,利用规范形式理论和中心流形定理,解析确定了周期解的稳定性与Hopf分岔方向,数值例子也证实了所得结论。 In this paper, a neural equation with discrete time delay is studied, The transcendental equation corresponding to the above-mentioned linearized system is analyzed. The linear stability for this model has been investigated. For the case with inhibitory influence from the past state, it is found that Hopf bifurcation occurs when this influence varies and passes through a sequence of critical values. The stability of bifurcating periodic solutions and the direction of Hopf bifurcation are determined by applying the normal form theory and the center manifold theorem. Some numerical examples illustrated those results.
作者 周尚波 廖晓峰 虞厥邦
机构地区 电子科技大学光电子技术系 重庆大学计算机学院
出处 《电子与信息学报》 EI CSCD 北大核心 2002年第9期1209-1217,共9页 Journal of Electronics & Information Technology
关键词 任意激活函数 时延神经元方程 神经元 离散时延 稳定性 HOPF分岔 周期解 Neuron, Discrete time delay, Stability, Holf bifurcation, Periodic solution
分类号 TN-05 [电子电信] Q811.212 [生物学—生物工程]
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共引文献6

同被引文献7

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  • 3Xiaofeng Liao, Zhongfu Wu, Juebang Yu, Stability switches and bifurcation analysis of a neural network with continuously delay, IEEE Trans. on SMC-A., 1999, 29(6), 692-698.
  • 4K. Murali, M. Lakshmanon, L. O. Chua, The simplest dissipative nonautonomous chaotic circuit,IEEE Trans. on CAS-I, 1994, 41(6), 462-463.
  • 5K. Gopalsmay, K. C. Leung, Convergence under dynamical thresholds with delays, IEEE Trans.on Neural Networks, 1994, 8(4), 341-348.
  • 6Xiaofeng Liao, Zhongfu Wu, Juebang Yu, Hopf bifurcation analysis of a neural system with a continuously distributed delay, International Symposium on Signal Processing and Intelligent System, Guangzhou, China, Nov. 1999, 546-549.
  • 7Liao Xiaofeng, Wong Kwokwo, Wu Zhongfu, Bifurcation analysis in a two-neuron system with distributed delays, Physica D, 2001, 179(1/2), 123-141.

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电子与信息学报
2002年 第9期

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