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Autori principali: Sherry, Ferdia, Celledoni, Elena, Ehrhardt, Matthias J., Murari, Davide, Owren, Brynjulf, Schönlieb, Carola-Bibiane
Natura: Preprint
Pubblicazione: 2023
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Accesso online:https://arxiv.org/abs/2306.17332
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author Sherry, Ferdia
Celledoni, Elena
Ehrhardt, Matthias J.
Murari, Davide
Owren, Brynjulf
Schönlieb, Carola-Bibiane
author_facet Sherry, Ferdia
Celledoni, Elena
Ehrhardt, Matthias J.
Murari, Davide
Owren, Brynjulf
Schönlieb, Carola-Bibiane
contents Motivated by classical work on the numerical integration of ordinary differential equations we present a ResNet-styled neural network architecture that encodes non-expansive (1-Lipschitz) operators, as long as the spectral norms of the weights are appropriately constrained. This is to be contrasted with the ordinary ResNet architecture which, even if the spectral norms of the weights are constrained, has a Lipschitz constant that, in the worst case, grows exponentially with the depth of the network. Further analysis of the proposed architecture shows that the spectral norms of the weights can be further constrained to ensure that the network is an averaged operator, making it a natural candidate for a learned denoiser in Plug-and-Play algorithms. Using a novel adaptive way of enforcing the spectral norm constraints, we show that, even with these constraints, it is possible to train performant networks. The proposed architecture is applied to the problem of adversarially robust image classification, to image denoising, and finally to the inverse problem of deblurring.
format Preprint
id arxiv_https___arxiv_org_abs_2306_17332
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Designing Stable Neural Networks using Convex Analysis and ODEs
Sherry, Ferdia
Celledoni, Elena
Ehrhardt, Matthias J.
Murari, Davide
Owren, Brynjulf
Schönlieb, Carola-Bibiane
Machine Learning
Motivated by classical work on the numerical integration of ordinary differential equations we present a ResNet-styled neural network architecture that encodes non-expansive (1-Lipschitz) operators, as long as the spectral norms of the weights are appropriately constrained. This is to be contrasted with the ordinary ResNet architecture which, even if the spectral norms of the weights are constrained, has a Lipschitz constant that, in the worst case, grows exponentially with the depth of the network. Further analysis of the proposed architecture shows that the spectral norms of the weights can be further constrained to ensure that the network is an averaged operator, making it a natural candidate for a learned denoiser in Plug-and-Play algorithms. Using a novel adaptive way of enforcing the spectral norm constraints, we show that, even with these constraints, it is possible to train performant networks. The proposed architecture is applied to the problem of adversarially robust image classification, to image denoising, and finally to the inverse problem of deblurring.
title Designing Stable Neural Networks using Convex Analysis and ODEs
topic Machine Learning
url https://arxiv.org/abs/2306.17332