Khadija Sadik scite author profile

In this paper, we focus on a numerical method of a problem called the Perona-Malik inequality which we use for image denoising. This model is obtained as the limit of the Perona-Malik model and the p-Laplacian operator with p → ∞. In Atlas et al., (Nonlinear Anal. Real World Appl 18:57-68, 2014), the authors have proved the existence and uniqueness of the solution of the proposed model. However, in their work, they used the explicit numerical scheme for approximated problem which is strongly dependent to the parameter p. To overcome this, we use in this work an efficient algorithm which is a combination of the classical additive operator splitting and a nonlinear relaxation algorithm. At last, we have presented the experimental results in image filtering show, which demonstrate the efficiency and effectiveness of our algorithm and finally, we have compared it with the previous scheme presented in

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A New Nonlocal Model for the Restoration of Textured Images

Karami¹,

Meskine²,

Sadik³

2019

jaac

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Nonlocal total variation system for the restoration of textured images

Karami

Meskine

Sadik

2020

International Journal of Computer Mathematics

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Variable Exponent Nonlocal Model with Weaker Norm in the Fidelity Term for Image Restoration

Karami

Meskine

Sadik

2018

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Khadija Sadik

A variable exponent nonlocal p(x)-Laplacian equation for image restoration

A splitting algorithm for a novel regularization of Perona-Malik and application to image restoration

A New Nonlocal Model for the Restoration of Textured Images

Nonlocal total variation system for the restoration of textured images

Variable Exponent Nonlocal Model with Weaker Norm in the Fidelity Term for Image Restoration

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