On the Role of Noise in the Sample Complexity of Learning Recurrent Neural Networks: Exponential Gaps for Long Sequences

Abstract

We consider the class of noisy multi-layered sigmoid recurrent neural networks with w (unbounded) weights for classification of sequences of length T, where independent noise distributed according to N(0,σ2) is added to the output of each neuron in the network. Our main result shows that the sample complexity of PAC learning this class can be bounded by O (w(T/σ)). For the non-noisy version of the same class (i.e., σ=0), we prove a lower bound of (wT) for the sample complexity. Our results indicate an exponential gap in the dependence of sample complexity on T for noisy versus non-noisy networks. Moreover, given the mild logarithmic dependence of the upper bound on 1/σ, this gap still holds even for numerically negligible values of σ.