Wavelets and multiscale signal processing
著者
書誌事項
Wavelets and multiscale signal processing
(Applied mathematics and mathematical computation, 11)
Chapman & Hall, c1995
- タイトル別名
-
Ondelettes et traitement numérique du signal
大学図書館所蔵 件 / 全45件
-
該当する所蔵館はありません
- すべての絞り込み条件を解除する
注記
Bibliography: p. [229]-231
Includes indexes
内容説明・目次
内容説明
Since their appearance in mid-1980s, wavelets and, more generally, multiscale methods have become powerful tools in mathematical analysis and in applications to numerical analysis and signal processing. This book is based on "Ondelettes et Traitement Numerique du Signal" by Albert Cohen. It has been translated from French by Robert D. Ryan and extensively updated by both Cohen and Ryan. It studies the existing relations between filter banks and wavelet decompositions and shows how these relations can be exploited in the context of digital signal processing.
Throughout, the book concentrates on the fundamentals. It begins with a chapter on the concept of multiresolution analysis, which contains complete proofs of the basic results. The description of filter banks that are related to wavelet bases is elaborated in both the orthogonal case (Chapter 2), and in the biorthogonal case (Chapter 4). The regularity of wavelets, how this is related to the properties of the filters and the importance of regularity for the algorithms are the subjects of Chapter 3. Chapter 5 looks at multiscale decomposition as it applies to stochastic processing, in particular to signal and image processing.
目次
Introduction. Multiresolution analysis. Introduction. The continuos point of view. The multivariate case. Conclusion. Wavelets and conjugate quadrature filters. Introduction. The general case. The finite case. Wavelets with compact support. Action of the FWT on oscillating signals. The Regularity of scaling functions and wavelets. Introduction. Regularity and oscillation. The subdivision algorithms. Spectral estimates of the regularity. Estimation of the Lp-Soboley exponent. Applications. Biorthogonal wavelet bases. Introduction. General principles of Subband coding. Unconditional biorthogonal wavelet bases. Dual filters and biorthogonal Riesz bases. Examples and applications. Stochastic processes. Introduction. Linear approximation. Linear approximation of images. Piecewise stationary processes. Nonlinear approximation. Quasi-analytic wavelet bases. Multivariate constructions. Multiscale unconditional bases. Notation. Reference.
「Nielsen BookData」 より