Constructive Approximation by Superposition of Sigmoidal Functions 被引量：2

Constructive Approximation by Superposition of Sigmoidal Functions

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摘要 In this paper, a constructive theory is developed for approximating func- tions of one or more variables by superposition of sigmoidal functions. This is done in the uniform norm as well as in the L^p norm. Results for the simultaneous approx- imation, with the same order of accuracy, of a function and its derivatives （whenever these exist）, are obtained. The relation with neural networks and radial basis func- tions approximations is discussed. Numerical examples are given for the purpose of illustration. In this paper, a constructive theory is developed for approximating func- tions of one or more variables by superposition of sigmoidal functions. This is done in the uniform norm as well as in the L^p norm. Results for the simultaneous approx- imation, with the same order of accuracy, of a function and its derivatives （whenever these exist）, are obtained. The relation with neural networks and radial basis func- tions approximations is discussed. Numerical examples are given for the purpose of illustration.

作者 Danilo Costarelli Renato Spigler

机构地区 Dipartimento di Matematica

出处《Analysis in Theory and Applications》 2013年第2期169-196,共28页 分析理论与应用（英文刊）

基金 supported, in part, by the GNAMPA and the GNFM of the Italian INdAM

关键词 Sigmoidal functions multivariate approximation L^p approximation neural net-works radial basis functions. Sigmoidal functions, multivariate approximation, L^p approximation, neural net-works, radial basis functions.

分类号 O174 [理学—基础数学]

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参考文献2

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