Wavelets, approximation, and statistical applications /

The mathematical theory of wavelets was developed by Yes Meyer and many collaborators about ten years ago. It was designed for approximation of possibly irregular functions and surfaces and was successfully applied in data compression, turbulence analysis, and image and signal processing. Five years...

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Bibliographic Details
Corporate Author: SpringerLink (Online service)
Other Authors: Härdle, Wolfgang
Format: eBook
Language:English
Published: New York : Springer, 1998.
Series:Lecture notes in statistics (Springer-Verlag) ; v. 129.
Subjects:
Online Access:Connect to the full text of this electronic book
Table of Contents:
  • Wavelets
  • The Haar basis wavelet system
  • The idea of multiresolution analysis
  • Some facts from Fourier analysis
  • Basic relations of wavelet theory
  • Construction of wavelet bases
  • Compactly supported wavelets
  • Wavelets and approximation
  • Wavelets and Besov spaces
  • Statistical estimation using wavelets
  • Wavelet thresholding and adaption
  • Computational aspects and software.