Wavelets and partial differential equations for image denoising

Vittoria Bruni, Benedetto Piccoli, Domenico Vitulano


In this paper a wavelet based model for image de-noising is presented. Wavelet coefficients are modelled as waves that grow while dilating along scales. The model establishes a precise link between corresponding modulus maxima in the wavelet domain and then allows to predict wavelet coefficients at each scale from the first one. This property combined with the theoretical results about the characterization of singularities in the wavelet domain enables to discard noise. Significant structures of the image are well recovered while some annoying artifacts along image edges are reduced. Some experimental results show that the proposed approach outperforms the most recent and effective wavelet based denoising schemes.

keywords: Image restoration, wavelets, scale space analysis


Image restoration; wavelets; scale space analysis

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