Provable approximation properties for deep neural networks
Machine Learning
2017-04-24 v3 Machine Learning
Neural and Evolutionary Computing
Abstract
We discuss approximation of functions using deep neural nets. Given a function on a -dimensional manifold , we construct a sparsely-connected depth-4 neural network and bound its error in approximating . The size of the network depends on dimension and curvature of the manifold , the complexity of , in terms of its wavelet description, and only weakly on the ambient dimension . Essentially, our network computes wavelet functions, which are computed from Rectified Linear Units (ReLU)
Keywords
Cite
@article{arxiv.1509.07385,
title = {Provable approximation properties for deep neural networks},
author = {Uri Shaham and Alexander Cloninger and Ronald R. Coifman},
journal= {arXiv preprint arXiv:1509.07385},
year = {2017}
}
Comments
accepted for publication in Applied and Computational Harmonic Analysis