A Smoothed l0-Norm and l1-Norm Regularization Algorithm for Computed Tomography

Abstract: The nonmonotone alternating direction algorithm (NADA) was recently proposed for effectively solving a class of equality-constrained nonsmooth optimization problems and applied to the total variation minimization in image reconstruction, but the reconstructed images suffer from the artifacts. Though by the l0-norm regularization the edge can be effectively retained, the problem is NP hard. The smoothed l0-norm approximates the l0-norm as a limit of smooth convex functions and provides a smooth measure of spars… Show more

“…Numerical experiments indicate that the algorithm has the advantage in suppressing slope artifacts. A combined smoothed l 0 -norm and l 1 -norm regularization algorithm using the NADA method for CT image reconstruction is proposed and demonstrated to have better performance than the l 1 -norm regularization [19].…”

An Algorithm ofl1-Norm andl0-Norm Regularization Algorithm for CT Image Reconstruction from Limited Projection

“…Numerical experiments indicate that the algorithm has the advantage in suppressing slope artifacts. A combined smoothed l 0 -norm and l 1 -norm regularization algorithm using the NADA method for CT image reconstruction is proposed and demonstrated to have better performance than the l 1 -norm regularization [19].…”

An Algorithm ofl1-Norm andl0-Norm Regularization Algorithm for CT Image Reconstruction from Limited Projection

Image compression and reconstruction in compressive sensing paradigm