In this paper, we consider a regularized least squares problem subject to convex constraints. Our algorithm is based on the superiorization technique, equipped with a new step size rule which uses subgradient projections. The superiorization method is a two-step method where one step reduces the value of the penalty term and the other step reduces the residual of the underlying linear system (using an algorithmic operator T). For the new step size rule, we present a convergence analysis for the case when T belongs to a large subclass of strictly quasi-nonexpansive operators. To examine our algorithm numerically, we consider box constraints and use the total variation (TV) functional as a regularization term. The specific test cases are chos...
The l1-norm regularization has attracted attention for image reconstruction in computed tomography. ...
International audienceThis paper presents new fast algorithms to minimize total variation and more g...
Statistical methods for tomographic image reconstruction have improved noise and spatial resolution ...
In this paper, we consider a regularized least squares problem subject to convex constraints. Our al...
Abstract We present a practical implementation of an optimal first-order method, due to Nesterov, fo...
AbstractSIRT and CG-type methods have been successfully employed for the approximate solution of lea...
Exploiting sparsity in the image gradient magnitude has proved to be an effective means for reducing...
International audienceThis paper describes a new efficient conjugate subgradient algorithm which min...
In this work we solve inverse problems coming from the area of Computed Tomography by means of regul...
Medical image reconstruction by total variation minimization is a newly developed area in computed t...
The sparse solutions of an underdetermined linear system Ax = b under certain condition can be obtai...
The main contribution of this paper is presenting a flexible solution to the box-constrained least s...
AbstractThis work addresses the problem of regularized linear least squares (RLS) with non-quadratic...
Row-action methods play an important role in tomographic image reconstruction. Many such methods can...
Computed tomography (CT) has been widely applied in medical imaging and industry for over decades. C...
The l1-norm regularization has attracted attention for image reconstruction in computed tomography. ...
International audienceThis paper presents new fast algorithms to minimize total variation and more g...
Statistical methods for tomographic image reconstruction have improved noise and spatial resolution ...
In this paper, we consider a regularized least squares problem subject to convex constraints. Our al...
Abstract We present a practical implementation of an optimal first-order method, due to Nesterov, fo...
AbstractSIRT and CG-type methods have been successfully employed for the approximate solution of lea...
Exploiting sparsity in the image gradient magnitude has proved to be an effective means for reducing...
International audienceThis paper describes a new efficient conjugate subgradient algorithm which min...
In this work we solve inverse problems coming from the area of Computed Tomography by means of regul...
Medical image reconstruction by total variation minimization is a newly developed area in computed t...
The sparse solutions of an underdetermined linear system Ax = b under certain condition can be obtai...
The main contribution of this paper is presenting a flexible solution to the box-constrained least s...
AbstractThis work addresses the problem of regularized linear least squares (RLS) with non-quadratic...
Row-action methods play an important role in tomographic image reconstruction. Many such methods can...
Computed tomography (CT) has been widely applied in medical imaging and industry for over decades. C...
The l1-norm regularization has attracted attention for image reconstruction in computed tomography. ...
International audienceThis paper presents new fast algorithms to minimize total variation and more g...
Statistical methods for tomographic image reconstruction have improved noise and spatial resolution ...