The aim of this paper is to estimate the approximation error which results from the method of feedforward neural networks (FNNs) with logarithmic sigmoidal function s(x) = (1+e−x)−1. By means of an extending function approach, a class of FNNs with single hidden layer and the active function s(x) is constructed to approximate the continuous function defined on a compact interval. By using the modulus of continuity of function as metric, the rate of convergence of the FNNs is estimated. Also, a numerical examples for illustrating the theoretical results is given.
展开▼
机译:本文的目的是估计具有对数矩形函数S(x)=(1 + e -x )的方法的前馈神经网络(fnns)的方法产生的近似误差。 1 。通过扩展功能方法,构造具有单个隐藏层和活动功能S(X)的一类FNN,以近似于紧凑的间隔定义的连续功能。通过使用功能的连续性模量作为度量,估计FNNS的收敛速率。此外,给出了用于说明理论结果的数值示例。
展开▼
