| 隐层小波元神经网络的非线性跟踪特性 |
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| 引用本文: | 侯霞,胡寿松. 隐层小波元神经网络的非线性跟踪特性[J]. 信息与控制, 2005, 34(1): 126-128 |
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| 作者姓名: | 侯霞 胡寿松 |
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| 作者单位: | 南京航空航天大学自动化学院,江苏,南京,210016 |
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| 基金项目: | 国家自然科学基金重点资助项目(60234010),高校博士点基金资助项目(20040287005) |
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| 摘 要: | 基于Hilbert 空间中Lebesgue 划分的特点,运用算子理论中变换的连续性和相对紧集的拓扑结构研究了小波神经网络的跟踪特性,利用作为隐层激励函数的小波函数的紧支撑和可积性,从代数分析的角度证明了只要隐层激活函数的小波函数满足相应的性质,那么小波神经网络就能以任意的精度跟踪紧集上的连续非线性函数.仿真实例表明了小波神经网络对非线性函数来说是一致跟踪器.
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| 关 键 词: | 小波神经网络 跟踪 Hilbert 空间 Lebesgue划分 相对紧集 |
| 文章编号: | 1002-0411(2005)01-0126-03 |
| 收稿时间: | 2004-05-31 |
The Nonlinear Tracing Property of the Hidden Wavelet Neurons Networks |
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| HOU Xia,HU Shou song. The Nonlinear Tracing Property of the Hidden Wavelet Neurons Networks[J]. Information and Control, 2005, 34(1): 126-128 |
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| Authors: | HOU Xia HU Shou song |
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| Abstract: | In this paper, the tracking characteristics of wavelet neural networks are studied on the basis of the traits of Lebesgue partition in the Hilbert space, by using the transpositional continuity of the operator theory and the topology structure of the relatively compact set. If the wavelet function, the activation function of hidden layer, is satisfied with the corresponding properties, the wavelet neural networks can track the smooth nonlinear function in compact set with any precision. This conclusion is drawn from the view of algebraic analysis and by the compact support and integral characteristics of wavelet function. The simulation indicates that the wavelet neural network is a universal tracker to the nonlinear function. |
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