Sparse-view image reconstruction via total absolute curvature combining total variation for X-ray computed tomography.

Sparse-view imaging is a promising scanning approach which has fast scanning rate and low-radiation dose in X-ray computed tomography (CT). Conventional L1-norm based total variation (TV) has been widely used in image reconstruction since the advent of compressive sensing theory. However, with only the first order information of the image used, the TV often generates dissatisfactory image for some applications. As is widely known, image curvature is among the most important second order features of images and can potentially be applied in image reconstruction for quality improvement. This study incorporates the curvature in the optimization model and proposes a new total absolute curvature (TAC) based reconstruction method. The proposed model contains both total absolute curvature and total variation (TAC-TV), which are intended for better description of the featured complicated image. As for the practical algorithm development, the efficient alternating direction method of multipliers (ADMM) is utilized, which generates a practical and easy-coded algorithm. The TAC-TV iterations mainly contain FFTs, soft-thresholding and projection operations and can be launched on graphics processing unit, which leads to relatively high performance. To evaluate the presented algorithm, both qualitative and quantitative studies were performed using various few view datasets. The results illustrated that the proposed approach yielded better reconstruction quality and satisfied convergence property compared with TV-based methods.

[1]  A. Akan,et al.  Iterative image reconstruction using non-local means with total variation from insufficient projection data. , 2016, Journal of X-ray science and technology.

[2]  Bin Yan,et al.  Image reconstruction based on total-variation minimization and alternating direction method in linear scan computed tomography , 2013 .

[3]  Raymond H. Chan,et al.  HIGH-ORDER TOTAL VARIATION REGULARIZATION APPROACH FOR AXIALLY SYMMETRIC OBJECT TOMOGRAPHY FROM A SINGLE RADIOGRAPH , 2015 .

[4]  P. Lions,et al.  Splitting Algorithms for the Sum of Two Nonlinear Operators , 1979 .

[5]  Tony F. Chan,et al.  Image processing and analysis - variational, PDE, wavelet, and stochastic methods , 2005 .

[6]  D. Mumford Elastica and Computer Vision , 1994 .

[7]  Ke Chen,et al.  A Fourth-Order Variational Image Registration Model and Its Fast Multigrid Algorithm , 2011, Multiscale Model. Simul..

[8]  Yin Zhang,et al.  An efficient augmented Lagrangian method with applications to total variation minimization , 2013, Computational Optimization and Applications.

[9]  Ross T. Whitaker,et al.  Geometric surface processing via normal maps , 2003, TOGS.

[10]  Ke Chen,et al.  Image denoising using the Gaussian curvature of the image surface , 2016 .

[11]  E. Candès,et al.  Stable signal recovery from incomplete and inaccurate measurements , 2005, math/0503066.

[12]  L. Rudin,et al.  Nonlinear total variation based noise removal algorithms , 1992 .

[13]  Tony F. Chan,et al.  Image Denoising Using Mean Curvature of Image Surface , 2012, SIAM J. Imaging Sci..

[14]  Ke Chen,et al.  Fast iterative algorithms for solving the minimization of curvature-related functionals in surface fairing , 2013, Int. J. Comput. Math..

[15]  Jianhua Ma,et al.  Extracting Information From Previous Full-Dose CT Scan for Knowledge-Based Bayesian Reconstruction of Current Low-Dose CT Images , 2016, IEEE Transactions on Medical Imaging.

[16]  Ke Chen,et al.  Homotopy method for a mean curvature-based denoising model , 2012 .

[17]  Hao Gao Fast parallel algorithms for the x-ray transform and its adjoint. , 2012, Medical physics.

[18]  Stephen P. Boyd,et al.  Distributed Optimization and Statistical Learning via the Alternating Direction Method of Multipliers , 2011, Found. Trends Mach. Learn..

[19]  H. Tuy AN INVERSION FORMULA FOR CONE-BEAM RECONSTRUCTION* , 1983 .

[20]  Xue-Cheng Tai,et al.  Augmented Lagrangian method for a mean curvature based image denoising model , 2013 .

[21]  Tony F. Chan,et al.  High-Order Total Variation-Based Image Restoration , 2000, SIAM J. Sci. Comput..

[22]  Jinyi Qi,et al.  Iterative reconstruction techniques in emission computed tomography , 2006, Physics in medicine and biology.

[23]  Emmanuel J. Candès,et al.  Robust uncertainty principles: exact signal reconstruction from highly incomplete frequency information , 2004, IEEE Transactions on Information Theory.

[24]  David L Donoho,et al.  Compressed sensing , 2006, IEEE Transactions on Information Theory.

[25]  Xue-Cheng Tai,et al.  A Fast Algorithm for Euler's Elastica Model Using Augmented Lagrangian Method , 2011, SIAM J. Imaging Sci..

[26]  Yan Bin,et al.  Image reconstruction Algorithm based on inexact alternating direction total-variation minimization , 2013 .

[27]  Arvid Lundervold,et al.  Noise removal using fourth-order partial differential equation with applications to medical magnetic resonance images in space and time , 2003, IEEE Trans. Image Process..

[28]  Junfeng Yang,et al.  A New Alternating Minimization Algorithm for Total Variation Image Reconstruction , 2008, SIAM J. Imaging Sci..