Title :
The Marr wavelet pyramid
Author :
Van De Ville, Dimitri ; Unser, Michael
Author_Institution :
Biomed. Imaging Group, Ecole Polytech. Federate de Lausanne (EPFL), Lausanne
Abstract :
We introduce a new semi-orthogonal complex wavelet basis of L2(R2). The basis functions are associated to the complex gradient-Laplace operator, which plays a central role in image processing. We define analytically a single-generator wavelet that is shifted on the coset positions of the subsampling matrix. Next, we propose the "wavelet Marr pyramid" for an extension of the new basis that achieves near shift-invariance and steerability (using a Gaussian-like smoothing kernel), for a mild redundancy factor only. This new wavelet pyramid decomposition closely mimicks the basic operations of Marx\´s framework for early vision. The pyramid is implemented by a fast filterbank algorithm using the FFT.
Keywords :
Laplace transforms; fast Fourier transforms; image processing; matrix algebra; smoothing methods; wavelet transforms; FFT; Gaussian-like smoothing kernel; Marr wavelet pyramid; Marx framework for early vision; basis functions; complex gradient-Laplace operator; coset positions; fast filterbank algorithm; image processing; near shift-invariance; semiorthogonal complex wavelet basis; single-generator wavelet; steerability; subsampling matrix; wavelet Marr pyramid; wavelet pyramid decomposition; Biomedical imaging; Filters; Fourier transforms; Image processing; Kernel; Matrix decomposition; Smoothing methods; Spline; Wavelet analysis; Wavelet transforms; Laplacian-of-Gaussian; complex-valued wavelets;
Conference_Titel :
Image Processing, 2008. ICIP 2008. 15th IEEE International Conference on
Conference_Location :
San Diego, CA
Print_ISBN :
978-1-4244-1765-0
Electronic_ISBN :
1522-4880
DOI :
10.1109/ICIP.2008.4712377
