On High-Order Denoising Models and Fast Algorithms for Vector-Valued Images

Author

Brito-Loeza, Carlos ; Chen, Ke

Author_Institution

Dept. of Math. Sci., Univ. of Liverpool, Liverpool, UK

Volume

19

Issue

6

fYear

2010

fDate

6/1/2010 12:00:00 AM

Firstpage

1518

Lastpage

1527

Abstract

Variational techniques for gray-scale image denoising have been deeply investigated for many years; however, little research has been done for the vector-valued denoising case and the very few existent works are all based on total-variation regularization. It is known that total-variation models for denoising gray-scaled images suffer from staircasing effect and there is no reason to suggest this effect is not transported into the vector-valued models. High-order models, on the contrary, do not present staircasing. In this paper, we introduce three high-order and curvature-based denoising models for vector-valued images. Their properties are analyzed and a fast multigrid algorithm for the numerical solution is provided. AMS subject classifications: 68U10, 65F10, 65K10.

Keywords

image denoising; partial differential equations; curvature-based denoising models; fast multigrid algorithm; fourth-order partial differential equations; gray-scale image denoising; high-order denoising models; staircasing effect; total variation regularization model; vector-valued image denoising; Fourth-order partial differential equations (PDEs); image denoising; multilevel methods; regularization; variational models; Algorithms; Artifacts; Image Enhancement; Image Interpretation, Computer-Assisted; Reproducibility of Results; Sensitivity and Specificity; Signal Processing, Computer-Assisted;

fLanguage

English

Journal_Title

Image Processing, IEEE Transactions on

Publisher

ieee

ISSN

1057-7149

Type

jour

DOI

10.1109/TIP.2010.2042655

Filename

5411803