Multiresolution approximations and wavelet orthonormal bases of L^2(R)
TLDR
In this paper, the authors study the properties of multiresolution approximation and prove that it is characterized by a 2π periodic function, which is further described in terms of wavelet orthonormal bases.Abstract:
A multiresolution approximation is a sequence of embedded vector spaces V j jmember Z for approximating L 2 (R) functions. We study the properties of a multiresolution approximation and prove that it is characterized by a 2π periodic function which is further described. From any multiresolution approximation, we can derive a function ψ(x) called a wavelet such that √ 2 j ψ(2 j x −k) (k ,j)member Z 2 is an orthonormal basis of L 2 (R). This provides a new approach for understanding and computing wavelet orthonormal bases. Finally, we characterize the asymptotic decay rate of multiresolution approximation errors for functions in a Sobolev space H s .read more
Citations
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Image Restoration: A Data-Driven Perspective
Bin Dong,Zuowei Shen +1 more
TL;DR: This article reviews the development of the wavelet frame (or more general redundant system) based approach for image restoration from a data-driven perspective and shows how specific information of image can be used to further improve the models and algorithms.
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On Frame Wavelets Associated with Frame Multiresolution Analysis
Hong Oh Kim,Jae Kun Lim +1 more
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Oblique and Hierarchical Multiwavelet Bases
TL;DR: The oblique multiwavelet theory as discussed by the authors was developed to accommodate a wider variety of wavelet bases, including orthogonal, semiorthogonal and biorthogo-nogonal wavelets, and circumvent the noncommutativity problems that arise in the construction of multiwavelets.
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Construction of biorthogonal wavelets starting from any two multiresolutions
TL;DR: The construction method takes a point of view opposite to the one of Cohen-Daubechies-Feauveau (1992, which starts from a well-choosen pair of biorthogonal discrete filters), where the necessary and sufficient condition is the nonperpendicularity of the multiresolutions.
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Application of the wavelet transform method in quantitative analysis of Raman spectra
TL;DR: In this paper, the wavelet transform method was used to measure and de-noise the Raman spectra of ethanolic solutions of CCl4 of different concentrations, and the results showed that noise can be filtered efficiently without changing the peak positions and the linear relationships between the peak intensity and the concentration can be maintained.
References
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A theory for multiresolution signal decomposition: the wavelet representation
TL;DR: In this paper, it is shown that the difference of information between the approximation of a signal at the resolutions 2/sup j+1/ and 2 /sup j/ (where j is an integer) can be extracted by decomposing this signal on a wavelet orthonormal basis of L/sup 2/(R/sup n/), the vector space of measurable, square-integrable n-dimensional functions.
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Orthonormal bases of compactly supported wavelets
TL;DR: This work construct orthonormal bases of compactly supported wavelets, with arbitrarily high regularity, by reviewing the concept of multiresolution analysis as well as several algorithms in vision decomposition and reconstruction.
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Decomposition of Hardy functions into square integrable wavelets of constant shape
A. Grossmann,J. Morlet +1 more
TL;DR: In this article, the authors studied square integrable coefficients of an irreducible representation of the non-unimodular $ax + b$-group and obtained explicit expressions in the case of a particular analyzing family that plays a role analogous to coherent states (Gabor wavelets) in the usual $L_2 $ -theory.
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Exact reconstruction techniques for tree-structured subband coders
TL;DR: It is shown that it is possible to design tree-structured analysis/reconstruction systems which meet the sampling rate condition and which result in exact reconstruction of the input signal.
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Analysis of sound patterns through wavelet transforms
TL;DR: The main features of so-called wavelet transforms are illustrated through simple mathematical examples and the first applications of the method to the recognition and visualisation of characteristic features of speech and of musical sounds are presented.