神经网络的鲁棒性

El Mahdi El Mhamdi, R. Guerraoui, Sébastien Rouault
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引用次数: 19

摘要

随着基于神经网络的机器学习的发展及其在关键任务应用中的使用,反对神经网络黑盒子方面的声音越来越高,因为理解它们的局限性和能力变得至关重要。随着神经形态硬件的兴起,理解神经网络作为一个分布式系统如何容忍其计算节点、神经元及其通信通道、突触的故障变得更加关键。通过实验来评估神经网络的稳健性,涉及到一种不切实际的冒险:在所有可能的输入上测试所有可能的失败,最终导致第一种情况的组合爆炸,而第二种情况则不可能收集到所有可能的输入。在本文中,我们证明了当一组神经元崩溃时,输出的期望误差的上界。这个边界涉及到对网络参数的依赖,在一般情况下,这可能被视为过于悲观。它涉及到对神经元激活函数的Lipschitz系数的多项式依赖,以及对发生故障的层的深度的指数依赖。我们用实验来支持我们的理论结果,说明我们的预测在多大程度上符合网络参数和鲁棒性之间的依赖关系。我们的结果表明,神经网络对平均崩溃的鲁棒性可以估计,而不需要在所有故障配置上测试网络,也不需要访问用于训练网络的训练集,这两者实际上都是不可能的要求。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
On the Robustness of a Neural Network
With the development of neural networks based machine learning and their usage in mission critical applications, voices are rising against the black box aspect of neural networks as it becomes crucial to understand their limits and capabilities. With the rise of neuromorphic hardware, it is even more critical to understand how a neural network, as a distributed system, tolerates the failures of its computing nodes, neurons, and its communication channels, synapses. Experimentally assessing the robustness of neural networks involves the quixotic venture of testing all the possible failures, on all the possible inputs, which ultimately hits a combinatorial explosion for the first, and the impossibility to gather all the possible inputs for the second.In this paper, we prove an upper bound on the expected error of the output when a subset of neurons crashes. This bound involves dependencies on the network parameters that can be seen as being too pessimistic in the average case. It involves a polynomial dependency on the Lipschitz coefficient of the neurons' activation function, and an exponential dependency on the depth of the layer where a failure occurs. We back up our theoretical results with experiments illustrating the extent to which our prediction matches the dependencies between the network parameters and robustness. Our results show that the robustness of neural networks to the average crash can be estimated without the need to neither test the network on all failure configurations, nor access the training set used to train the network, both of which are practically impossible requirements.
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