A Fast Optimization Transfer Algorithm for Image Inpainting in Wavelet Domains

Author

Chan, Raymond H. ; Wen, You-Wei ; Yip, Andy M.

Author_Institution

Dept. of Math., Chinese Univ. of Hong Kong, Shatin

Volume

18

Issue

7

fYear

2009

fDate

7/1/2009 12:00:00 AM

Firstpage

1467

Lastpage

1476

Abstract

A wavelet inpainting problem refers to the problem of filling in missing wavelet coefficients in an image. A variational approach was used by Chan et al. The resulting functional was minimized by the gradient descent method. In this paper, we use an optimization transfer technique which involves replacing their univariate functional by a bivariate functional by adding an auxiliary variable. Our bivariate functional can be minimized easily by alternating minimization: for the auxiliary variable, the minimum has a closed form solution, and for the original variable, the minimization problem can be formulated as a classical total variation (TV) denoising problem and, hence, can be solved efficiently using a dual formulation. We show that our bivariate functional is equivalent to the original univariate functional. We also show that our alternating minimization is convergent. Numerical results show that the proposed algorithm is very efficient and outperforms that of Chan et al.

Keywords

convergence of numerical methods; gradient methods; image denoising; minimisation; variational techniques; wavelet transforms; auxiliary variable; bivariate functional; convergent minimization; fast optimization transfer algorithm; gradient descent method; image inpainting problem; missing wavelet coefficients; total variation denoising problem; univariate functional; variational approach; Alternating minimization; image inpainting; optimization transfer; total variation; wavelet;

fLanguage

English

Journal_Title

Image Processing, IEEE Transactions on

Publisher

ieee

ISSN

1057-7149

Type

jour

DOI

10.1109/TIP.2009.2019806

Filename

4967886