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Compactly Supported Wavelets in Sobolev Spaces of Integer Order

✍ Scribed by F. Bastin; P. Laubin

Publisher
Elsevier Science
Year
1997
Tongue
English
Weight
162 KB
Volume
4
Category
Article
ISSN
1063-5203

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✦ Synopsis

We present a construction of regular compactly supported wavelets in any Sobolev space of integer order. It is based on the existence and suitable estimates of filters defined from polynomial equations. We give an implicit study of these filters and use the results obtained to construct scaling functions leading to multiresolution analysis and wavelets. Their regularity increases linearly with the length of their supports as in the L 2 case. One technical problem is to prove that the intersection of the scaling spaces is reduced to 0. This is solved using sharp estimates of Littlewood-Paley type.

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