When the Discrete Fourier Transform of an image is computed, the image is implicitly assumed to be periodic. Since there is no reason for opposite borders to be alike, the periodic image generally presents strong discontinuities across the frame border. These edge effects cause several artifacts in the Fourier Transform, in particular a wellknown cross structure made of high energy coefficients along the axes, which can have strong consequences on image processing or image analysis techniques based on the image spectrum (including interpolation, texture analysis, image quality assessment, etc.). In this paper, we show that an image can be decomposed into a sum of a periodic component and a smooth component, which brings a simple and computationally efficient answer to this problem. We discuss the interest of such a decomposition on several applications. © Springer Science+Business Media, LLC 2010.
CITATION STYLE
Moisan, L. (2011). Periodic plus smooth image decomposition. Journal of Mathematical Imaging and Vision, 39(2), 161–179. https://doi.org/10.1007/s10851-010-0227-1
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