Wavelets from a Statistical Perspective

Name: Wavelets from a Statistical Perspective
Brand: Taylor & Francis Ltd
SKU: 9781032200675
Price: 132.99 EUR
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Maarten Jansen

€132.99

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A01=Maarten Jansen

advanced statistical modeling

Author_Maarten Jansen

Besov Norms

Besov Spaces

bias variance tradeoff

Category=PBKF

Category=PBT

Cwt

data smoothing techniques

Detail Coefficients

eq_isMigrated=1

eq_isMigrated=2

eq_nobargain

Equidistant Knots

Fast Wavelet Transform

Full Rank Design Matrix

Haar Transform

image analysis methods

Laplacian Pyramid

lifiting

Lifting Scheme

Local Polynomial

Mexican Hat Wavelet

multiscale

multiscale transform applications

nonequispaced

nonparametric regression

Orthogonal Wavelet Transforms

Perfect Reconstruction Condition

Scaling Coefficients

Scaling Functions

second generation wavelets

signal denoising

Sobolev Norm

Soft Thresholding

splines

thresholding

Triangular Hat

Universal Threshold

Vanishing Moments

Voronoi Cells

Wavelet Coefficients

Wavelet Packet

Wavelet Transform

Product details

ISBN 9781032200675
Weight: 640g
Dimensions: 156 x 234mm
Publication Date: 15 Apr 2022
Publisher: Taylor & Francis Ltd
Publication City/Country: GB
Product Form: Hardback

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Wavelets from a Statistical Perspective offers a modern, 2nd generation look on wavelets, far beyond the rigid setting of the equispaced, dyadic wavelets in the early days. With the methods of this book, based on the lifting scheme, researchers can set up a wavelet or another multiresolution analysis adapted to their data, ranging from images to scattered data or other irregularly spaced observations. Whereas classical wavelets stand a bit apart from other nonparametric methods, this book adds a multiscale touch to your spline, kernel or local polynomial smoothing procedure, thereby extending its applicability to nonlinear, nonparametric processing for piecewise smooth data.

One of the chapters of the book constructs B-spline wavelets on nonequispaced knots and multiscale local polynomial transforms. In another chapter, the link between wavelets and Fourier analysis, ubiquitous in the classical approach, is explained, but without being inevitable. In further chapters the discrete wavelet transform is contrasted with the continuous version, the nondecimated (or maximal overlap) transform taking an intermediate position. An important principle in designing a wavelet analysis through the lifting scheme is finding the right balance between bias and variance. Bias and variance also play a crucial role in the nonparametric smoothing in a wavelet framework, in finding well working thresholds or other smoothing parameters. The numerous illustrations can be reproduced with the online available, accompanying software. The software and the exercises can also be used as a starting point in the further exploration of the material.

Maarten Jansen is professor at the Mathematics and Computer Science departments of the Université libre de Bruxelles.

Wavelets from a Statistical Perspective

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