The fractional spline wavelet transform: definition end implementation

Author

Blu, Thierry ; Unser, Michael

Author_Institution

Biomed. Imaging Group, Swiss Fed. Inst. of Technol., Lausanne, Switzerland

Volume

1

fYear

2000

fDate

2000

Firstpage

512

Abstract

We define a new wavelet transform that is based on a previously defined family of scaling functions: the fractional B-splines. The interest of this family is that they interpolate between the integer degrees of polynomial B-splines and that they allow a fractional order of approximation. The orthogonal fractional spline wavelets essentially behave as fractional differentiators. This property seems promising for the analysis of 1/f^α noise that can be whitened by an appropriate choice of the degree of the spline transform. We present a practical FFT-based algorithm for the implementation of these fractional wavelet transforms, and give some examples of processing

Keywords

1/f noise; channel bank filters; fast Fourier transforms; interpolation; iterative methods; signal processing; splines (mathematics); wavelet transforms; white noise; 1/f^α noise; FFT-based algorithm; fractional B-splines; fractional differentiators; fractional order of approximation; fractional spline wavelet transform; fractional wavelet transforms; integer degrees; interpolate; orthogonal fractional spline wavelets; polynomial B-splines; scaling functions; 1f noise; Biomedical imaging; Filters; Image reconstruction; Polynomials; Signal analysis; Signal detection; Spline; Wavelet analysis; Wavelet transforms;

fLanguage

English

Publisher

ieee

Conference_Titel

Acoustics, Speech, and Signal Processing, 2000. ICASSP '00. Proceedings. 2000 IEEE International Conference on

Conference_Location

Istanbul

ISSN

1520-6149

Print_ISBN

0-7803-6293-4

Type

conf

DOI

10.1109/ICASSP.2000.862030

Filename

862030