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- 2018
脉冲干扰复数域Cohen-Grossberg神经网络的稳定性
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Abstract:
为了分析脉冲干扰因素对复数域神经网络的影响,研究了一类具有脉冲干扰的变时滞复数域Cohen-Grossberg神经网络的平衡点的动态行为.在假定放大函数、自反馈函数以及激活函数定义在复数域的情况下,首先,利用M矩阵和同胚映射的相关原理,分析了该系统平衡点的存在性和唯一性;其次,利用向量Lyapunov函数法以及数学归纳法,研究了该系统平衡点的全局模指数稳定性,并建立的稳定性判据;最后,通过两个数值仿真算例验证了所得结论的实用性和正确性.仿真结果显示系统状态在0.5 s便可收敛到平衡状态.研究结果表明:时滞和脉冲干扰强度越大、放大函数越小,则神经元状态的指数收敛速度越慢.
:To analyse the effect of impulsive disturbances on neural networks, the dynamical behaviour of these disturbances was examined at the module of the equilibrium point of a class of complex-valued Cohen-Grossberg neural networks with time-varying delays. It was assumed that amplification, self-feedback, and activation functions were defined in a complex number domain. First, the existence and uniqueness of the equilibrium point of the system were analysed by utilising the corresponding property of the M matrix and the theorem of homeomorphism mapping. Second, the globally exponential stability of the module of the equilibrium point of the system was studied by applying the vector Lyapunov function and mathematical induction methods. The corresponding stability criteria were then established. Finally, two numerical examples from simulations were given to illustrate the practicability and correctness of the obtained results. The simulation results revealed that the states of the addressed system can reach equilibrium within 0.5 s. Other results showed that the greater the delay and impulsive strength and the smaller the amplification, the slower was the state convergence rate
| [1] | RAKKIYAPPAN R, CAO Jinde, VELMURUGAN G. Existence and uniform stability analysis of fractional-order complex-valued neural networks with time delays[J]. IEEE Transactions on Neural Networks and Learning Systems, 2015, 26(1):84-97. |
| [2] | JIAN Jigui, WANG Peng. Lagrange α-exponential stability and α-exponential convergence for fractional-order complex-valued neural networks[J]. Neural Networks, 2017, 91(7):1-10. |
| [3] | HUANG Yujiao, ZHANG Huaguang, WANG Zhanshan. Multistability of complex-valued recurrent neural networks with real-imaginary-type activation functions[J]. Applied Mathematics and Computation, 2014, 229(4):187-200. |
| [4] | 施继忠,徐晓惠,张继业. 扩散反应脉冲Cohen-Grossberg神经网络的鲁棒稳定性[J]. 西南交通大学学报,2010,45(4):596-602. SHI Jizhong, XU Xiaohui, ZHANG Jiye. Robust stability of impulsive Cohen-Grossberg neural networks with reaction-diffusion terms[J]. Journal of Southwest Jiaotong University, 2010, 45(4):596-602. |
| [5] | COHEN M A, GROSSBERG S. Absolute stability and global pattern formation and parallel memory storage by competitive neural networks[J]. IEEE Transactions on Systems, Man and Cybernetics Society, 1983, 13(5):815-825. |
| [6] | 龙兰,徐晓惠,张继业. 时滞Cohen-Grossberg神经网络的全局稳定性[J]. 西南交通大学学报,2008,43(3):381-386. LONG Lan, XU Xiaohui, ZHANG Jiye. Global stability analysis in Cohen-Grossberg neural networks with unbounded time delays[J]. Journal of Southwest Jiaotong University, 2008, 43(3):381-386. |
| [7] | 楼旭阳,崔宝同. 具反应扩散混合时滞Cohen-Grossberg神经网络的指数耗散性[J]. 控制理论与应用,2008,25(4):619-622. LOU Xuyang, CUI Baotong. Exponential dissipativity of Cohen-Grossberg neural networks with mixed delays and reaction-diffusion terms[J]. Control Theory & Applications, 2008, 25(4):619-622. |
| [8] | SONG Qiankun, CAO Jinde. Impulsive effects on stability of fuzzy Cohen-Grossberg neural networks with time-varying delays[J]. IEEE Transactions on Systems, Man, and Cybernetics, 2007, 37(3):733-741. |
| [9] | FANG Tao, SUN Jitao. Stability analysis of complex-valued impulsive system[J]. IET Control Theory and Applications, 2013, 7(8):1152-1159. |
| [10] | 徐晓惠,张继业,施继忠,等. 脉冲干扰时滞复值神经网络的稳定性分析[J]. 哈尔滨工业大学学报,2016,48(3):166-170. XU Xiaohui, ZHANG Jiye, SHI Jizhong, et al. Stability analysis of delayed complex-valued neural networks with impulsive disturbances[J]. Journal of Harbin Institute of Technology, 2016, 48(3):166-170. |
| [11] | XU Xiaohui, ZHANG Jiye, SHI Jizhong. Dynamical behaviour analysis of delayed complex-valued neural networks with impulsive effect[J]. International Journal of Systems Science, 2017, 48(4):686-694. |
| [12] | ZHAO Zhenjiang, SONG Qiankun. Stability of complex-valued Cohen-Grossberg neural networks with time-varying delays[C]//13th International Symposium on Neural Networks.[S.l.]:Springer, 2016:168-176. |
| [13] | ZHOU Bo, SONG Qiankun. Boundedness and complete stability of complex-valued neural networks with time delay[J]. IEEE Transactions on Neural Networks and Learning Systems, 2013, 24(8):1227-1238. |
| [14] | HU Jin, WANG Jun. Global exponential periodicity and stability of discrete-time complex-valued recurrent neural networks with time-delays[J]. Neural Networks, 2015, 66(6):119-130. |
| [15] | SONG Qiankun, YAN Huan, ZHAO Zhenjiang, et al. Global exponential stability of complex-valued neural networks with both time-varying delays and impulsive effects[J]. Neural Networks, 2016, 79(7):108-116. |
| [16] | ZHANG Jiye, SUDA Y, KOMINE H. Global exponential stability of Cohen-Grossberg neural networks with variable delays[J]. Physics Letters, 2005, 338(1):44-50. |
| [17] | JIAN Jigui, JIANG Wenlin. Lagrange exponential stability for fuzzy Cohen-Grossberg neural networks with time-varying delays[J]. Fuzzy Sets and Systems, 2015, 277(19):65-80. |
| [18] | LI Liangliang, JIAN Jigui. Exponential convergence and Lagrange stability for impulsive Cohen-Grossberg neural networks with time-varying delays[J]. Journal of Computational and Applied Mathematics, 2015, 277(5):23-35. |
| [19] | HU Jin, WANG Jun. Global stability of complex-valued recurrent neural networks with time-delays[J]. IEEE Transactions on Neural Networks and Learning Systems, 2012, 23(6):853-864. |
| [20] | WANG Limin, SONG Qiankun, LIU Yurong, et al. Global asymptotic stability of impulsive fractional-order complex-valued neural networks with time delay[J]. Neurocomputing, 2017, 243(14):49-59. |
