A primal dual proximal point method of Chambolle-Pock algorithms for ℓ1-TV minimization problems in image reconstruction

• Published in: 2012 5th International Conference on Biomedical Engineering and Informatics pp. 12 - 16
• Main Authors: Tang, Yuchao, Peng, Jigen, Yue, Shigang, Xu, Jiawei
• Format: Conference Proceeding
• Language: English
• Published: IEEE 01.10.2012
• Subjects: Computed tomography; Convex functions; Data models; Image reconstruction; Linear programming; Noise; Signal to noise ratio; Total variance; Vectors
• ISBN: 9781467311830; 1467311839
• DOI: 10.1109/BMEI.2012.6513092

Computed tomography (CT) image reconstruction problems can be solved by finding the minimizer of a suitable objective function. The objective function usually consists of a data fidelity term and a regularization term. Total variation (TV) minimization problems are widely used for solving incomplete data problems in CT image reconstruction. In this paper, we focus on the CT image reconstruction model which combines the TV regularization and ℓ 1 data error term. We introduce a primal dual proximal point method of Chambolle-Pock algorithm to solve the proposed optimization problem. We tested it on computer simulated data and the experiment results shown it exhibited good performance when used to few-view CT image reconstruction.