Abstract In this paper, we study the split-feasibility problem in Hilbert spaces by using the projected reflected gradient algorithm. As applications, we study the convex linear inverse problem and the split-equality problem in Hilbert spaces, and we give new algorithms for these problems. Finally, numerical results are given for our main results
This paper deals with the split feasibility problem that requires to find a point closest to a close...
In thispaper, we introduce and consider a new problem of finding u ∈ K(u) such that Au ∈C, where K :...
Abstract In this article, we first introduce two simultaneous projection algorithms for solving the ...
In this paper, we first study in a Hilbertian framework the weak convergence of a general Gradient P...
Abstract In this paper, we consider the relaxed gradient projection algorithm to solve the split equ...
Abstract In this paper, we introduce an iterative scheme using the gradient projection method with a...
Introducing a general split feasibility problem in the setting of infinite-dimensional Hilbert space...
Abstract In this paper, we are concerned with the split equality problem (SEP) in Hilbert spaces. By...
In this paper, we concern with the split feasibility problem (SFP) in real Hilbert space whenever th...
We consider the split feasibility problem (SFP) in Hilbert spaces, inspired by extragradient method ...
Abstract. The split feasibility problem has many applications in various fields of science and techn...
AbstractLet C and Q be nonempty closed convex sets in Rn and Rm, respectively, and A an m by n real ...
Abstract The split equality problem has board applications in many areas of applied mathematics. Man...
Let C and Q be closed convex subsets of real Hilbert spaces H1 and H2, respectively, and let g:C→R b...
The goal of this manuscript is to establish strong convergence theorems for inertial shrinking proje...
This paper deals with the split feasibility problem that requires to find a point closest to a close...
In thispaper, we introduce and consider a new problem of finding u ∈ K(u) such that Au ∈C, where K :...
Abstract In this article, we first introduce two simultaneous projection algorithms for solving the ...
In this paper, we first study in a Hilbertian framework the weak convergence of a general Gradient P...
Abstract In this paper, we consider the relaxed gradient projection algorithm to solve the split equ...
Abstract In this paper, we introduce an iterative scheme using the gradient projection method with a...
Introducing a general split feasibility problem in the setting of infinite-dimensional Hilbert space...
Abstract In this paper, we are concerned with the split equality problem (SEP) in Hilbert spaces. By...
In this paper, we concern with the split feasibility problem (SFP) in real Hilbert space whenever th...
We consider the split feasibility problem (SFP) in Hilbert spaces, inspired by extragradient method ...
Abstract. The split feasibility problem has many applications in various fields of science and techn...
AbstractLet C and Q be nonempty closed convex sets in Rn and Rm, respectively, and A an m by n real ...
Abstract The split equality problem has board applications in many areas of applied mathematics. Man...
Let C and Q be closed convex subsets of real Hilbert spaces H1 and H2, respectively, and let g:C→R b...
The goal of this manuscript is to establish strong convergence theorems for inertial shrinking proje...
This paper deals with the split feasibility problem that requires to find a point closest to a close...
In thispaper, we introduce and consider a new problem of finding u ∈ K(u) such that Au ∈C, where K :...
Abstract In this article, we first introduce two simultaneous projection algorithms for solving the ...