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Main Authors: Kim, Jinwoo, Nguyen, Tien Dat, Suleymanzade, Ayhan, An, Hyeokjun, Hong, Seunghoon
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2306.02866
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author Kim, Jinwoo
Nguyen, Tien Dat
Suleymanzade, Ayhan
An, Hyeokjun
Hong, Seunghoon
author_facet Kim, Jinwoo
Nguyen, Tien Dat
Suleymanzade, Ayhan
An, Hyeokjun
Hong, Seunghoon
contents We present a novel framework to overcome the limitations of equivariant architectures in learning functions with group symmetries. In contrary to equivariant architectures, we use an arbitrary base model such as an MLP or a transformer and symmetrize it to be equivariant to the given group by employing a small equivariant network that parameterizes the probabilistic distribution underlying the symmetrization. The distribution is end-to-end trained with the base model which can maximize performance while reducing sample complexity of symmetrization. We show that this approach ensures not only equivariance to given group but also universal approximation capability in expectation. We implement our method on various base models, including patch-based transformers that can be initialized from pretrained vision transformers, and test them for a wide range of symmetry groups including permutation and Euclidean groups and their combinations. Empirical tests show competitive results against tailored equivariant architectures, suggesting the potential for learning equivariant functions for diverse groups using a non-equivariant universal base architecture. We further show evidence of enhanced learning in symmetric modalities, like graphs, when pretrained from non-symmetric modalities, like vision. Code is available at https://github.com/jw9730/lps.
format Preprint
id arxiv_https___arxiv_org_abs_2306_02866
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Learning Probabilistic Symmetrization for Architecture Agnostic Equivariance
Kim, Jinwoo
Nguyen, Tien Dat
Suleymanzade, Ayhan
An, Hyeokjun
Hong, Seunghoon
Machine Learning
Artificial Intelligence
We present a novel framework to overcome the limitations of equivariant architectures in learning functions with group symmetries. In contrary to equivariant architectures, we use an arbitrary base model such as an MLP or a transformer and symmetrize it to be equivariant to the given group by employing a small equivariant network that parameterizes the probabilistic distribution underlying the symmetrization. The distribution is end-to-end trained with the base model which can maximize performance while reducing sample complexity of symmetrization. We show that this approach ensures not only equivariance to given group but also universal approximation capability in expectation. We implement our method on various base models, including patch-based transformers that can be initialized from pretrained vision transformers, and test them for a wide range of symmetry groups including permutation and Euclidean groups and their combinations. Empirical tests show competitive results against tailored equivariant architectures, suggesting the potential for learning equivariant functions for diverse groups using a non-equivariant universal base architecture. We further show evidence of enhanced learning in symmetric modalities, like graphs, when pretrained from non-symmetric modalities, like vision. Code is available at https://github.com/jw9730/lps.
title Learning Probabilistic Symmetrization for Architecture Agnostic Equivariance
topic Machine Learning
Artificial Intelligence
url https://arxiv.org/abs/2306.02866