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Main Authors: Czaja, Wojciech, Kolstoe, Brandon, Koralov, David
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2410.21030
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author Czaja, Wojciech
Kolstoe, Brandon
Koralov, David
author_facet Czaja, Wojciech
Kolstoe, Brandon
Koralov, David
contents The main result of our paper offers an alternative, simpler, proof of Mallat's result on the translation invariance of the limiting behavior of sequences of Wavelet Scattering Transforms, which (unlike Mallat's proof) does not rely on the admissibility condition or on the density of a logarithmic Sobolev space in $L^2$. Furthermore, this result is generalized to a broader class of scattering transforms, including, for instance, a modification of the Fourier Scattering Transform. As a result, we also prove a new upper bound for the translation contraction for the Fourier Scattering Transform.
format Preprint
id arxiv_https___arxiv_org_abs_2410_21030
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Translation-Invariant Behavior of General Scattering Transforms
Czaja, Wojciech
Kolstoe, Brandon
Koralov, David
Functional Analysis
The main result of our paper offers an alternative, simpler, proof of Mallat's result on the translation invariance of the limiting behavior of sequences of Wavelet Scattering Transforms, which (unlike Mallat's proof) does not rely on the admissibility condition or on the density of a logarithmic Sobolev space in $L^2$. Furthermore, this result is generalized to a broader class of scattering transforms, including, for instance, a modification of the Fourier Scattering Transform. As a result, we also prove a new upper bound for the translation contraction for the Fourier Scattering Transform.
title Translation-Invariant Behavior of General Scattering Transforms
topic Functional Analysis
url https://arxiv.org/abs/2410.21030