Add to ORKGAbstract—Solving a convex set theoretic image recovery problem amounts to finding a point in the intersection of closed and convex sets in a Hilbert space. The projection onto convex sets (POCS) algorithm, in which an initial estimate is sequentially projected onto the individual sets according to a periodic schedule, has been the most prevalent tool to solve such problems. Nonetheless, POCS has several shortcomings: It converges slowly, it is ill suited for implementation on parallel processors, and it requires the computation of exact projections at each iteration. In this paper, we propose a general parallel projection method (EMOPSP) that overcomes these shortcomings. At each iteration of EMOPSP, a convex combination of subgradient proj...
The convex feasibility problem of nding a point in the intersection of nitely many nonempty closed c...
The process of image restoration aims to enhance images corrupted by noise and blurred. Iterative te...
AbstractA unified framework is presented for studying the convergence of projection methods for find...
AbstractAn iterative method is proposed for solving convex feasibility problems. Each iteration is a...
International audienceMany problems in medical image reconstruction and machine learning can be form...
summary:The method of projections onto convex sets to find a point in the intersection of a finite n...
Due to their extraordinary utility and broad applicability in many areas of classical mathematics an...
summary:The method of projections onto convex sets to find a point in the intersection of a finite n...
The convex feasibility problem (CFP) is a classical problem in nonlinear analysis. In this paper, we...
In this paper, we propose a new method, which is called the combination projection method (CPM), for...
AbstractAn iterative method to solve the convex feasibility problem for a finite family of convex se...
The notion of relaxation is well understood for orthogonal projec tions onto convex sets For genera...
AbstractThe cyclic projections algorithm is an important method for determining a point in the inter...
A block-iterative projection algorithm for solving the consistent convex feasibility problem in a fi...
Truly three-dimensional reconstruction from projections can be carried out by the well known ART (Al...
The convex feasibility problem of nding a point in the intersection of nitely many nonempty closed c...
The process of image restoration aims to enhance images corrupted by noise and blurred. Iterative te...
AbstractA unified framework is presented for studying the convergence of projection methods for find...
AbstractAn iterative method is proposed for solving convex feasibility problems. Each iteration is a...
International audienceMany problems in medical image reconstruction and machine learning can be form...
summary:The method of projections onto convex sets to find a point in the intersection of a finite n...
Due to their extraordinary utility and broad applicability in many areas of classical mathematics an...
summary:The method of projections onto convex sets to find a point in the intersection of a finite n...
The convex feasibility problem (CFP) is a classical problem in nonlinear analysis. In this paper, we...
In this paper, we propose a new method, which is called the combination projection method (CPM), for...
AbstractAn iterative method to solve the convex feasibility problem for a finite family of convex se...
The notion of relaxation is well understood for orthogonal projec tions onto convex sets For genera...
AbstractThe cyclic projections algorithm is an important method for determining a point in the inter...
A block-iterative projection algorithm for solving the consistent convex feasibility problem in a fi...
Truly three-dimensional reconstruction from projections can be carried out by the well known ART (Al...
The convex feasibility problem of nding a point in the intersection of nitely many nonempty closed c...
The process of image restoration aims to enhance images corrupted by noise and blurred. Iterative te...
AbstractA unified framework is presented for studying the convergence of projection methods for find...