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Numerical stability of biorthogonal wavelet transforms |
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| Authors: | Gerlind Plonka Hagen Schumacher Manfred Tasche |
| Institution: | (1) Department of Mathematics, University of Duisburg-Essen, Campus Duisburg, 47048 Duisburg, Germany;(2) Institute of Mathematics, University of Rostock, 18055 Rostock, Germany |
| Abstract: | Biorthogonal wavelets are essential tools for numerous practical applications. It is very important that wavelet transforms work numerically stable in floating point arithmetic. This paper presents new results on the worst-case analysis of roundoff errors occurring in floating point computation of periodic biorthogonal wavelet transforms, i.e. multilevel wavelet decompositions and reconstructions. Both of these wavelet algorithms can be realized by matrix–vector products with sparse structured matrices. It is shown that under certain conditions the wavelet algorithms can be remarkably stable. Numerous tests demonstrate the performance of the results. |
| Keywords: | Biorthogonal wavelet transform Low-pass filter High-pass filter Periodic wavelet transform Wavelet decomposition Wavelet reconstruction Wavelet decomposition– reconstruction Numerical stability |
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