Shift-orthogonal wavelet bases using splines

Author

Unser, Michael ; Thévenaz, Philippe ; Aldroubi, Akram

Author_Institution

Nat. Center for Res. Resources, Nat. Inst. of Health, Bethesda, MD, USA

Volume

3

Issue

3

fYear

1996

fDate

3/1/1996 12:00:00 AM

Firstpage

85

Lastpage

88

Abstract

We present examples of a new type of wavelet basis functions that are orthogonal across shifts but not across scales. The analysis functions are piecewise linear while the synthesis functions are polynomial splines of degree n (odd). The approximation power of these representations is essentially as good as that of the corresponding Battle-Lemarie orthogonal wavelet transform, with the difference that the present wavelet synthesis filters have a much faster decay. This last property, together with the fact that these transformations are almost orthogonal, may be useful for image coding applications.

Keywords

filtering theory; image coding; splines (mathematics); wavelet transforms; analysis functions; approximation power; decay; image coding applications; orthogonal wavelet transform; piecewise linear functions; polynomial splines; shift orthogonal wavelet bases; synthesis functions; wavelet basis functions; wavelet synthesis filters; Finite impulse response filter; Image coding; Piecewise linear approximation; Piecewise linear techniques; Polynomials; Shape; Spline; Wavelet analysis; Wavelet transforms;

fLanguage

English

Journal_Title

Signal Processing Letters, IEEE

Publisher

ieee

ISSN

1070-9908

Type

jour

DOI

10.1109/97.481163

Filename

481163