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Main Authors: Sannai, Akiyoshi, Takai, Yuuki, Cordonnier, Matthieu
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2409.16922
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author Sannai, Akiyoshi
Takai, Yuuki
Cordonnier, Matthieu
author_facet Sannai, Akiyoshi
Takai, Yuuki
Cordonnier, Matthieu
contents In this paper, we develop a theory about the relationship between invariant and equivariant maps with regard to a group $G$. We then leverage this theory in the context of deep neural networks with group symmetries in order to obtain novel insight into their mechanisms. More precisely, we establish a one-to-one relationship between equivariant maps and certain invariant maps. This allows us to reduce arguments for equivariant maps to those for invariant maps and vice versa. As an application, we propose a construction of universal equivariant architectures built from universal invariant networks. We, in turn, explain how the universal architectures arising from our construction differ from standard equivariant architectures known to be universal. Furthermore, we explore the complexity, in terms of the number of free parameters, of our models, and discuss the relation between invariant and equivariant networks' complexity. Finally, we also give an approximation rate for G-equivariant deep neural networks with ReLU activation functions for finite group G.
format Preprint
id arxiv_https___arxiv_org_abs_2409_16922
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Decomposition of Equivariant Maps via Invariant Maps: Application to Universal Approximation under Symmetry
Sannai, Akiyoshi
Takai, Yuuki
Cordonnier, Matthieu
Machine Learning
In this paper, we develop a theory about the relationship between invariant and equivariant maps with regard to a group $G$. We then leverage this theory in the context of deep neural networks with group symmetries in order to obtain novel insight into their mechanisms. More precisely, we establish a one-to-one relationship between equivariant maps and certain invariant maps. This allows us to reduce arguments for equivariant maps to those for invariant maps and vice versa. As an application, we propose a construction of universal equivariant architectures built from universal invariant networks. We, in turn, explain how the universal architectures arising from our construction differ from standard equivariant architectures known to be universal. Furthermore, we explore the complexity, in terms of the number of free parameters, of our models, and discuss the relation between invariant and equivariant networks' complexity. Finally, we also give an approximation rate for G-equivariant deep neural networks with ReLU activation functions for finite group G.
title Decomposition of Equivariant Maps via Invariant Maps: Application to Universal Approximation under Symmetry
topic Machine Learning
url https://arxiv.org/abs/2409.16922