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Main Authors: Charvin, Hippolyte, Volpi, Nicola Catenacci, Polani, Daniel
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2412.08954
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author Charvin, Hippolyte
Volpi, Nicola Catenacci
Polani, Daniel
author_facet Charvin, Hippolyte
Volpi, Nicola Catenacci
Polani, Daniel
contents Extraction of structure, in particular of group symmetries, is increasingly crucial to understanding and building intelligent models. In particular, some information-theoretic models of parsimonious learning have been argued to induce invariance extraction. Here, we formalise these arguments from a group-theoretic perspective. We then extend them to the study of more general probabilistic symmetries, through compressions preserving geometric measures of complexity. More precisely, our framework implements a trade-off between compression and preservation of the divergence from a given hierarchical model, yielding a novel generalisation of the Information Bottleneck framework. Through appropriate choices of hierarchical models, we fully characterise (in the discrete and full support case) channel invariance, channel equivariance and distribution invariance under permutation. Allowing imperfect divergence preservation then leads to principled definitions of "soft symmetries", where the "coarseness" corresponds to the degree of compression of the system. In simple synthetic experiments, we demonstrate that our method successively recovers, at increasingly compressed "resolutions", nested but increasingly perturbed equivariances, where new equivariances emerge at bifurcation points of the trade-off parameter. Our framework suggests a new path for the extraction of generalised probabilistic symmetries.
format Preprint
id arxiv_https___arxiv_org_abs_2412_08954
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle An Informational Parsimony Perspective on Probabilistic Symmetries
Charvin, Hippolyte
Volpi, Nicola Catenacci
Polani, Daniel
Information Theory
Extraction of structure, in particular of group symmetries, is increasingly crucial to understanding and building intelligent models. In particular, some information-theoretic models of parsimonious learning have been argued to induce invariance extraction. Here, we formalise these arguments from a group-theoretic perspective. We then extend them to the study of more general probabilistic symmetries, through compressions preserving geometric measures of complexity. More precisely, our framework implements a trade-off between compression and preservation of the divergence from a given hierarchical model, yielding a novel generalisation of the Information Bottleneck framework. Through appropriate choices of hierarchical models, we fully characterise (in the discrete and full support case) channel invariance, channel equivariance and distribution invariance under permutation. Allowing imperfect divergence preservation then leads to principled definitions of "soft symmetries", where the "coarseness" corresponds to the degree of compression of the system. In simple synthetic experiments, we demonstrate that our method successively recovers, at increasingly compressed "resolutions", nested but increasingly perturbed equivariances, where new equivariances emerge at bifurcation points of the trade-off parameter. Our framework suggests a new path for the extraction of generalised probabilistic symmetries.
title An Informational Parsimony Perspective on Probabilistic Symmetries
topic Information Theory
url https://arxiv.org/abs/2412.08954