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Bibliographic Details
Main Authors: Hong, Dawei, Birget, Jean-Camille
Format: Preprint
Published: 2001
Subjects:
Online Access:https://arxiv.org/abs/math/0105200
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author Hong, Dawei
Birget, Jean-Camille
author_facet Hong, Dawei
Birget, Jean-Camille
contents We analyse the wavelet shrinkage algorithm of Donoho and Johnstone in order to assess the quality of the reconstruction of a signal obtained from noisy samples. We prove deviation bounds for the maximum of the squares of the error, and for the average of the squares of the error, under the assumption that the signal comes from a H"older class, and the noise samples are independent, of 0 mean, and bounded. Our main technique is Talgrand's isoperimetric theorem. Our bounds refine the known expectations for the average of the squares of the error.
format Preprint
id arxiv_https___arxiv_org_abs_math_0105200
institution arXiv
publishDate 2001
record_format arxiv
spellingShingle Deviation Bounds for Wavelet Shrinkage
Hong, Dawei
Birget, Jean-Camille
Probability
Numerical Analysis
92A12 (signal theory), 65T60 (wavelets)
We analyse the wavelet shrinkage algorithm of Donoho and Johnstone in order to assess the quality of the reconstruction of a signal obtained from noisy samples. We prove deviation bounds for the maximum of the squares of the error, and for the average of the squares of the error, under the assumption that the signal comes from a H"older class, and the noise samples are independent, of 0 mean, and bounded. Our main technique is Talgrand's isoperimetric theorem. Our bounds refine the known expectations for the average of the squares of the error.
title Deviation Bounds for Wavelet Shrinkage
topic Probability
Numerical Analysis
92A12 (signal theory), 65T60 (wavelets)
url https://arxiv.org/abs/math/0105200