Wavelets and Statistics

Wavelets and Statistics

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Despite its short history, wavelet theory has found applications in a remarkable diversity of disciplines: mathematics, physics, numerical analysis, signal processing, probability theory and statistics. The abundance of intriguing and useful features enjoyed by wavelet and wavelet packed transforms has led to their application to a wide range of statistical and signal processing problems. On November 16-18, 1994, a conference on Wavelets and Statistics was held at Villard de Lans, France, organized by the Institute IMAG-LMC, Grenoble, France. The meeting was the 15th in the series of the Rencontres Pranco-Belges des 8tatisticiens and was attended by 74 mathematicians from 12 different countries. Following tradition, both theoretical statistical results and practical contributions of this active field of statistical research were presented. The editors and the local organizers hope that this volume reflects the broad spectrum of the conference. as it includes 21 articles contributed by specialists in various areas in this field. The material compiled is fairly wide in scope and ranges from the development of new tools for non parametric curve estimation to applied problems, such as detection of transients in signal processing and image segmentation. The articles are arranged in alphabetical order by author rather than subject matter. However, to help the reader, a subjective classification of the articles is provided at the end of the book. Several articles of this volume are directly or indirectly concerned with several as pects of wavelet-based function estimation and signal denoising.Wavelet shrinkage and wavelet-vaguelette decomposition: a 10-minute tour. In Proc. Inta#39;l. ... Wavelet based image denoising using a Markov Random Field prior model. ... Wavelet transform domain filters: a spatially selective noise filtration technique. IEEE Trans. Image Process, 3(6):747a€“758, 1994. MICRONDE : a Matlab Wavelet Toolbox for Signals and Images 238 References Malfait and D Roose.

Title:Wavelets and Statistics
Author:Anestis Antoniadis, Georges Oppenheim
Publisher:Springer Science & Business Media - 2012-12-06


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