conftrace_
2019 AISTATS AISTATS 2019

Fisher-Rao Metric, Geometry, and Complexity of Neural Networks

Abstract

We study the relationship between geometry and capacity measures for deep neural networks from an invariance viewpoint. We introduce a new notion of capacity — the Fisher-Rao norm — that possesses desirable invariance properties and is motivated by Information Geometry. We discover an analytical characterization of the new capacity measure, through which we establish norm-comparison inequalities and further show that the new measure serves as an umbrella for several existing norm-based complexity measures. We discuss upper bounds on the generalization error induced by the proposed measure. Extensive numerical experiments on CIFAR-10 support our theoretical findings. Our theoretical analysis rests on a key structural lemma about partial derivatives of multi-layer rectifier networks.

🌉 Interdisciplinary Bridge - Deep Learning and Machine Learning
🧭 Keyword Pioneer - fisher-rao norm
🐝 Cross-Pollinator - Artificial Intelligence, Computer Vision, Data Science & Analytics, Deep Learning, Machine Learning, Mathematics & Optimization, Reinforcement Learning
🐣 Hot Topic Early Bird - generalization error