Overview

Nowadays, some knowledge of wavelets is almost mandatory for mathematicians, physicists and electrical engineers. The emphasis in this volume, based on an intensive course on Wavelets given at CWI, Amsterdam, is on the affine case. The first part presents a concise introduction of the underlying theory to the uninitiated reader. The second part gives applications in various areas. Some of the contributions here are a fresh exposition of earlier work by others, while other papers contain new results by the authors. The areas are so diverse as seismic processing, quadrature formulae, and wavelet bases adapted to inhomogeneous cases.

Full Product Details

Author:   Tom H Koornwinder (Univ Of Amsterdam, The Netherlands)
Publisher:   World Scientific Publishing Co Pte Ltd
Imprint:   World Scientific Publishing Co Pte Ltd
Volume:   1
ISBN:  

9789810213886

ISBN 10:   9810213883
Pages:   240
Publication Date:   01 June 1993
Audience:   College/higher education ,  Professional and scholarly ,  Postgraduate, Research & Scholarly ,  Professional & Vocational
Format:   Hardback
Publisher's Status:   Active
Availability:   In Print  
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Table of Contents

Wavelets - first steps, N.M. Temme; wavelets - mathematical preliminaries, P.W. Hemker, et al; the continuous wavelet transform and its group theoretic interpretation, T.H. Koomwinder; discrete wavelets and multiresolution analysis, H. Heijmans; image compression using wavelets, P. Nacken; computing with wavelets, A.B. Olde Daalhuis; construction of wavelet bases adapted to inhomogeneous cases, P.W. Hemker and F. Plantevin; conjugate quadrature filters for multiresolution analysis and synthesis, E.H. Dooijes; calculation of the wavelet decomposition using quadrature formulae, W. Sweldens and R. Piessens; fast wavelet transforms and calderon-zygmud operators, T.H. Koomwinder; the finite wavelet transform with an application in seismic processing, J.A.H. Alkemade; wavelets understand fractals, M. Hazewinkel.

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