平滑斜坡函数激活的神经网络插值算子

IF 2 2区数学 Q1 MATHEMATICS

Analysis and Applications Pub Date : 2021-05-31 DOI:10.1142/S0219530521500123

Yunyou Qian, Dansheng Yu

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引用次数: 3

摘要

本文介绍了一些由光滑斜坡函数激活的神经网络插值算子。利用斜坡函数的光滑性，我们可以给出神经网络导数的一些有用的估计，并结合近似理论中的一些技术，使我们能够建立神经网络近似的逆估计。我们建立了由我们定义的新的神经网络算子逼近的正反结果，从而给出了基本逼近率。为了提高光滑函数的逼近率，我们进一步引入了新算子的线性组合。新的组合对目标函数及其导数进行插值。我们还通过新的组合估计了一致收敛速率和同时逼近速率。

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Neural network interpolation operators activated by smooth ramp functions

In this paper, we introduce some neural network interpolation operators activated by smooth ramp functions. By using the smoothness of the ramp functions, we can give some useful estimates of the derivatives of the neural networks, which combining with some techniques in approximation theory enable us to establish the converse estimates of approximation by neural networks. We establish both the direct and the converse results of approximation by the new neural network operators defined by us, and thus give the essential approximation rate. To improve the approximation rate for functions of smoothness, we further introduce linear combinations of the new operators. The new combinations interpolate the objective function and its derivative. We also estimate the uniform convergence rate and simultaneous approximation rate by the new combinations.

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来源期刊

Analysis and Applications 数学-数学

CiteScore

3.90

自引率

4.50%

发文量

审稿时长

>12 weeks

期刊介绍： Analysis and Applications publishes high quality mathematical papers that treat those parts of analysis which have direct or potential applications to the physical and biological sciences and engineering. Some of the topics from analysis include approximation theory, asymptotic analysis, calculus of variations, integral equations, integral transforms, ordinary and partial differential equations, delay differential equations, and perturbation methods. The primary aim of the journal is to encourage the development of new techniques and results in applied analysis.