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The fast wavelet transform on compact intervals as a tool in chemometrics: II. Boundary effects, denoising and compression

✍ Scribed by U. Depczynski; K. Jetter; K. Molt; A. Niemöller

Publisher: Elsevier Science
Year: 1999
Tongue: English
Weight: 413 KB
Volume: 49
Category: Article
ISSN: 0169-7439
DOI: 10.1016/s0169-7439(99)00037-4

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✦ Synopsis

This paper addresses a commonly observed problem with applying wavelet transforms WT to signals from laboratory measurements. These are the boundary effects which occur when analyzing finitely supported signals. The usual methods of how to avoid these kind of artefacts are discussed, and a solution to the problem is suggested by applying so-called Sturm-Ž . Liouville wavelets due to one of the present authors . We demonstrate that this type of wavelet can be used for signal denoising with a minimal loss of energy, a property which is well known to classical wavelets; this property also finds applications to data compression. All discussed methods are tested on data originating from NIR-spectrometric measurements.

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✍ U. Depczynski; K. Jetter; K. Molt; A. Niemöller 📂 Article 📅 1997 🏛 Elsevier Science 🌐 English ⚖ 644 KB

This paper gives an introduction to wavelets on the real line [w and on compact intervals. Fast decomposition and reconstruction algorithms are presented in detail, including pseudocodes. The time frequency localization properties of wavelets are demonstrated on a numerical example related to spectr