最优加权随机汇池网络的自适应算法研究

doi:10.13306/j.1672-3813.2018.04.011

复杂系统与复杂性科学

2018, Vol. 15

Issue (4): 85-89 DOI: 10.13306/j.1672-3813.2018.04.011

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最优加权随机汇池网络的自适应算法研究

韩博, 景文腾, 耿金花, 段法兵

青岛大学复杂性科学研究所,山东青岛 266071

Study of Adaptive Algorithms for Optimally Weighted Stochastic Pooling Networks

HAN Bo, JING Wenteng, GENG Jinhua, DUAN Fabing

Institute of Complexity Science, Qingdao University, Qingdao 266071, China

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摘要对最优加权随机汇池网络的自适应算法进行研究,以均方误差作为随机汇池网络输出性能评价指标,推导了最小均方(LMS)和Kalman-LMS算法的递归表达式,并应用到输入信号方差发生改变的非稳态情况中,结果表明两种自适应算法都能够迭代收敛到权的最优解。与LMS算法相比,Kalman-LMS算法不仅收敛速度快,而且权均方偏差每一步都是最优的,在网络节点的个数较少时,Kalman-LMS算法能够获得更小的均方误差,而随着网络节点的个数增加,两种自适应算法得到的均方误差趋于一致。

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关键词 ：随机汇池网络, 均方误差, 最小均方, 自适应算法, 非稳态信号

Abstract：In this paper, the adaptive algorithm of optimally weighted stochastic pool network is studied. The mean square error is used as the output performance evaluation index of the stochastic pooling network. The recursive expressions of the least mean square (LMS) algorithm and the Kalman-LMS algorithm are derived. The related results show that, for the nonstationary case of varying variances of inputs, both adaptive algorithms can converge to the optimal solution of weight vectors. However, the Kalman-LMS algorithm not only has a fast convergence speed, but also the weight mean square deviation is optimal at each step. When the number of network nodes is small, Kalman-LMS can obtain a smaller mean square error. As the number of network nodes increases, the mean square error obtained by the two adaptive algorithms tends to be consistent.

Key words： stochastic pooling networks mean square error least mean square adaptive algorithm nonstationary signal

出版日期: 2019-05-16

ZTFLH:

TN911.7

基金资助:国家自然科学基金(61573202)

通讯作者: 段法兵(1974),男,山东邹城人,博士,教授,主要研究方向为非线性信号处理。

作者简介: 韩博(1996),男,山东济宁人,硕士研究生,主要研究方向为自适应信号处理研究。

引用本文:

韩博, 景文腾, 耿金花, 段法兵. 最优加权随机汇池网络的自适应算法研究[J]. 复杂系统与复杂性科学, 2018, 15(4): 85-89.
HAN Bo, JING Wenteng, GENG Jinhua, DUAN Fabing. Study of Adaptive Algorithms for Optimally Weighted Stochastic Pooling Networks. Complex Systems and Complexity Science, 2018, 15(4): 85-89.

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http://fzkx.qdu.edu.cn/CN/10.13306/j.1672-3813.2018.04.011 或 http://fzkx.qdu.edu.cn/CN/Y2018/V15/I4/85

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[1]	景文腾, 韩博, 耿金花, 许丽艳, 段法兵. 最优加权随机汇池网络的估计性能研究[J]. 复杂系统与复杂性科学, 2018, 15(3): 89-93.

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