求解非线性方程的神经网络学习算法

[1993] Proceedings of the Second International Forum on Applications of Neural Networks to Power Systems Pub Date : 1993-03-20 DOI:10.1109/ANN.1993.264305

K. Aoki, M. Kanezashi, C. Maeda

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引用次数: 0

摘要

BP(反向传播)过程是一种流行的神经网络学习算法。尽管有许多成功的应用，BP工艺仍有一些已知的缺点。这些缺点源于BP过程是一个基于梯度的优化过程，没有线性搜索。本文提出了一种新的基于非线性方程求解方法的学习算法。与以往的优化方法相比，该方法收敛速度更快。牛顿法是求解非线性方程组的基本方法。然而，牛顿方法的主要困难在于它的收敛依赖于一个初始点。为了保证与初始点无关的全局收敛性，采用了同伦延拓方法。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Learning algorithm for neural networks by solving nonlinear equations

The BP (backpropagation) process is a popular learning algorithm for neural networks. Despite of many successful applications, the BP process has some known drawbacks. These drawbacks stem from that the BP process is a gradient based optimization procedure without a linear search. In this paper, a new learning algorithm is presented based on a solution method of nonlinear equations. Compared with the former optimization procedure, the proposed method often converges faster to desired results. Newton's method is basically applied to solve the nonlinear equations. However, the major difficulty with Newton's method is that its convergence depends on an initial point. In order to assure a global convergence, independent of an initial point, the Homotopy continuation method is employed.<>

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[1993] Proceedings of the Second International Forum on Applications of Neural Networks to Power Systems

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