Local Decomposition of Refinable Spaces and Wavelets

Carnicer, J. M.; Dahmen, Wolfgang; Peña, J. M.

doi:10.1006/acha.1996.0012

Cited by 177 publications

(147 citation statements)

References 24 publications

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“…After finishing this work, the authors learned that a similar construction was obtained independently by Dahmen and collaborators. We refer to the original papers [2,8] for details. 6.…”

Section: Remarksmentioning

confidence: 99%

Spherical wavelets: Efficiently representing functions on a sphere

Schröder¹,

Sweldens²

Wavelets in the Geosciences

265

409

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Wavelets have proven to be powerful bases for use in numerical analysis and signal processing. Their power lies in the fact that they only require a small number of coefficients to represent general functions and large data sets accurately. This allows compression and efficient computations. Classical constructions have been limited to simple domains such as intervals and rectangles. In this paper we present a wavelet construction for scalar functions defined on the sphere. We show how biorthogonal wavelets with custom properties can be constructed with the lifting scheme. The bases are extremely easy to implement and allow fully adaptive subdivisions. We give examples of functions defined on the sphere, such as topographic data, bidirectional reflection distribution functions, and illumination, and show how they can be efficiently represented with spherical wavelets.

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“…After finishing this work, the authors learned that a similar construction was obtained independently by Dahmen and collaborators. We refer to the original papers [2,8] for details. 6.…”

Section: Remarksmentioning

confidence: 99%

Spherical wavelets: Efficiently representing functions on a sphere

Schröder¹,

Sweldens²

Wavelets in the Geosciences

265

409

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“…When Φ is a singleton, i.e., Φ ≡ {φ}, the resulted subspace is referred to as principal and the function φ is referred to as its generator. The theory of shift-invariant spaces nowadays plays an essential role in a variety of scientific fields including approximation theory [14], multiresolution approximations and wavelets [15], finite elements [16], and sampling theory [17].…”

Section: Preliminaries: Approximation In Psi Subspacesmentioning

confidence: 99%

On approximation of smooth functions from samples of partial derivatives with application to phase unwrapping

Michailovich¹,

Tannenbaum²

2008

Signal Processing

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This paper addresses the problem of approximating smooth bivariate functions from the samples of their partial derivatives. The approximation is carried out under the assumption that the subspace to which the functions to be recovered are supposed to belong, possesses an approximant in the form of a principal shift-invariant (PSI) subspace. Subsequently, the desired approximation is found as the element of the PSI subspace that fits the data the best in the 2 -sense. In order to alleviate the ill-posedness of the process of finding such a solution, we take advantage of the discrete nature of the problem under consideration. The proposed approach allows the explicit construction of a projection operator which maps the measured derivatives into a stable and unique approximation of the corresponding function. Moreover, the paper develops the concept of discrete PSI subspaces, which may be of relevance for several practical settings where one is given samples of a function instead of its continuously defined values. As a final point, the application of the proposed method to the problem of phase unwrapping in homomorphic deconvolution is described.

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“…The lifting scheme (yielding so-called second generation wavelets) has become a popular standard tool to adapt wavelet bases to particular requirements, [31] (see also [8] for a quite similar approach called stable completion). The adaptation and usage of second-generation wavelets for the numerical solution of partial differential equations by a collocation method is introduced in [22,23,36,37].…”

Section: Lifting Schemementioning

confidence: 99%

On interpolatory divergence-free wavelets

Bittner

Urban

2006

Math. Comp.

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Abstract. We construct interpolating divergence-free multiwavelets based on cubic Hermite splines. We give characterizations of the relevant function spaces and indicate their use for analyzing experimental data of incompressible flow fields. We also show that the standard interpolatory wavelets, based on the Deslauriers-Dubuc interpolatory scheme or on interpolatory splines, cannot be used to construct compactly supported divergence-free interpolatory wavelets.

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Local Decomposition of Refinable Spaces and Wavelets

Cited by 177 publications

References 24 publications

Spherical wavelets: Efficiently representing functions on a sphere

Spherical wavelets: Efficiently representing functions on a sphere

On approximation of smooth functions from samples of partial derivatives with application to phase unwrapping

On interpolatory divergence-free wavelets

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