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Main Authors: Gong, Fuzhou, Xia, Zigeng
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2606.00157
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author Gong, Fuzhou
Xia, Zigeng
author_facet Gong, Fuzhou
Xia, Zigeng
contents We consider establishing the interpretability theory of deep learning through constructing a corresponding relationship between the renormalization group (RG) method in statistical physics and the training process of deep neural networks (DNNs). We have proved the constructed relationship using the one-dimensional Ising model as the input data. In this paper we generalize our results to the case of continuous input data, which is a necessary preparation for applying the corresponding framework to real-world data. To be representative, we consider a class of data distribution in the exponential family. We prove that when the parameters of fully connected (FC) DNNs achieve their optimal value after training, the characteristic parameters of the feature layer output of DNNs are equal to the fixed points of the characteristic parameters of input data under RG method for continuous fields. This conclusion shows that the training process of DNNs is equivalent to RG calculation on this kind of data and therefore the network can extract main features from the input data just like RG. Also, the equivalence further validates the correspondence framework we have established, providing an explanation for the outstanding performance of DNNs on real-world data.
format Preprint
id arxiv_https___arxiv_org_abs_2606_00157
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Interpreting FCDNNs via RG on Exponential Family
Gong, Fuzhou
Xia, Zigeng
Machine Learning
Artificial Intelligence
Probability
60H30, 82B28
We consider establishing the interpretability theory of deep learning through constructing a corresponding relationship between the renormalization group (RG) method in statistical physics and the training process of deep neural networks (DNNs). We have proved the constructed relationship using the one-dimensional Ising model as the input data. In this paper we generalize our results to the case of continuous input data, which is a necessary preparation for applying the corresponding framework to real-world data. To be representative, we consider a class of data distribution in the exponential family. We prove that when the parameters of fully connected (FC) DNNs achieve their optimal value after training, the characteristic parameters of the feature layer output of DNNs are equal to the fixed points of the characteristic parameters of input data under RG method for continuous fields. This conclusion shows that the training process of DNNs is equivalent to RG calculation on this kind of data and therefore the network can extract main features from the input data just like RG. Also, the equivalence further validates the correspondence framework we have established, providing an explanation for the outstanding performance of DNNs on real-world data.
title Interpreting FCDNNs via RG on Exponential Family
topic Machine Learning
Artificial Intelligence
Probability
60H30, 82B28
url https://arxiv.org/abs/2606.00157