Title :
The finite ridgelet transform for image representation
Author :
Do, Minh N. ; Vetterli, Martin
fDate :
1/1/2003 12:00:00 AM
Abstract :
The ridgelet transform was introduced as a sparse expansion for functions on continuous spaces that are smooth away from discontinuities along lines. We propose an orthonormal version of the ridgelet transform for discrete and finite-size images. Our construction uses the finite Radon transform (FRAT) as a building block. To overcome the periodization effect of a finite transform, we introduce a novel ordering of the FRAT coefficients. We also analyze the FRAT as a frame operator and derive the exact frame bounds. The resulting finite ridgelet transform (FRIT) is invertible, nonredundant and computed via fast algorithms. Furthermore, this construction leads to a family of directional and orthonormal bases for images. Numerical results show that the FRIT is more effective than the wavelet transform in approximating and denoising images with straight edges.
Keywords :
Radon transforms; discrete transforms; image denoising; image representation; FRAT coefficients ordering; continuous spaces; digital images; discrete images; exact frame bounds; fast algorithms; finite Radon transform; finite ridgelet transform; finite-size images; frame operator; image representation; images denoising; invertible transform; nonredundant transform; sparse function expansion; straight edges; wavelet transform; Continuous wavelet transforms; Discrete cosine transforms; Discrete transforms; Discrete wavelet transforms; Image denoising; Image processing; Image representation; Laboratories; Noise reduction; Wavelet domain;
Journal_Title :
Image Processing, IEEE Transactions on
DOI :
10.1109/TIP.2002.806252
