Fractional Adaptation of Activation Functions In Neural Networks

J. Zamora-Esquivel, Jesus Adan Cruz Vargas, P. López-Meyer
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引用次数: 1

Abstract

In this work, we introduce a generalization methodology for the automatic selection of the activation functions inside a neural network, taking advantage of concepts defined in fractional calculus. This methodology enables the neural network to search and optimize its own activation functions during the training process, by defining the fractional order of the derivative of a given primitive activation function. This fractional order is tuned as an additional training hyper-parameter $a$ for intrafamily selection and $b$ for cross family selection. By following this approach, the neurons inside the network can adjust their activation functions, e.g. from MLP to RBF networks, to best fit the input data, and reduce the output error. The experimental results obtained show the benefits of using this technique implemented on a ResNet18 topology, by outperforming the accuracy of a ResNet100 trained with CIFAR10 and Improving 1% ImageNet reported in the literature.
神经网络中激活函数的分数自适应
在这项工作中,我们引入了一种泛化方法,用于自动选择神经网络内的激活函数,利用分数阶微积分中定义的概念。该方法通过定义给定原始激活函数导数的分数阶,使神经网络能够在训练过程中搜索和优化自己的激活函数。这个分数阶作为额外的训练超参数$a$用于家族内选择,$b$用于跨家族选择。通过遵循这种方法,网络内部的神经元可以调整它们的激活函数,例如从MLP到RBF网络,以最佳地拟合输入数据,并减少输出误差。实验结果表明,在ResNet18拓扑上实现该技术的好处是优于用CIFAR10训练的ResNet100的精度,并提高了文献中报道的1%的ImageNet。
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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