Title :
Orthogonal quincunx wavelets with fractional orders
Author :
Feilner, Manuela ; Jacob, Mathews ; Unser, Michael
Author_Institution :
Biomed. Imaging Group, Swiss Fed. Inst. of Technol., Lausanne, Switzerland
fDate :
6/23/1905 12:00:00 AM
Abstract :
We present a new family of 2D orthogonal wavelets which use quincunx sampling. The orthogonal refinement filters have a simple analytical expression in the Fourier domain as a function of the order α, which may be non-integer. The wavelets have good isotropy properties. We can also prove that they yield wavelet bases of L2 (R2) for any α>0. The wavelets are fractional in the sense that the approximation error at a given scale α decays like O(aα); they also essentially behave like fractional derivative operators. To make our construction practical, we propose an FFT-based implementation that turns out to be surprisingly fast. In fact, our method is almost as efficient as the standard Mallat algorithm for separable wavelets
Keywords :
fast Fourier transforms; filtering theory; image sampling; wavelet transforms; 2D orthogonal wavelets; FFT; Fourier domain; Mallat algorithm; fractional derivative operators; fractional orders; image processing; isotropy properties; quincunx sampling; quincunx wavelets; refinement filters; wavelet bases; Discrete Fourier transforms; Filters; Fourier transforms; Frequency response; Image reconstruction; Image sampling; Lattices; Sampling methods; Transfer functions; Wavelet coefficients;
Conference_Titel :
Image Processing, 2001. Proceedings. 2001 International Conference on
Conference_Location :
Thessaloniki
Print_ISBN :
0-7803-6725-1
DOI :
10.1109/ICIP.2001.959118
