Image structure preserving denoising using generalized fractional time integrals

Eduardo Cuesta; Mokhtar Kirane; Salman A. Malik

doi:10.1016/j.sigpro.2011.09.001

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$Image structure preserving denoising using generalized fractional time integrals$

Journal article

Peer reviewed

Image structure preserving denoising using generalized fractional time integrals

Eduardo Cuesta, Mokhtar Kirane and Salman A. Malik

Signal processing, Vol.92(2), pp.553-563

01/02/2012

DOI: https://doi.org/10.1016/j.sigpro.2011.09.001

Abstract

Engineering

Engineering, Electrical & Electronic

Science & Technology

Technology

A generalization of the linear fractional integral equation u(t) = u(0) + partial derivative Au-alpha(t), 1 < alpha < 2, which is written as a Volterra matrix-valued equation when applied as a pixel-by-pixel technique is proposed in this paper for image denoising (restoration, smoothing, etc.). Since the fractional integral equation interpolates a linear parabolic equation and a hyperbolic equation, the solution enjoys intermediate properties. The Volterra equation we propose is well-posed for all t > 0, and allows us to handle the diffusion by means of a viscosity parameter instead of introducing nonlinearities in the equation as in the Perona-Malik and alike approaches. Several experiments showing the improvements achieved by our approach are provided. (C) 2011 Elsevier B.V. All rights reserved.

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Details

Title: Image structure preserving denoising using generalized fractional time integrals
Creators - without role: Eduardo Cuesta - Universidad de Valladolid
Mokhtar Kirane - University of La Rochelle
Salman A. Malik - Laboratoire de Mathématiques
Publication Details: Signal processing, Vol.92(2), pp.553-563
Publisher: Elsevier
Number of pages: 11
Grant note: FEDER funds; European Commission MTM2010-19510 / DGI-MCI
Identifiers: 9938876308331
Academic Unit: King Abdulaziz University
Language: English
Resource Type: Journal article