This paper deals with the split feasibility problem that requires to find a point closest to a closed convex set in one space such that its image under a linear transformation will be closest to another closed convex set in the image space. By combining perturbed strategy with inertial technique, we construct an inertial perturbed projection algorithm for solving the split feasibility problem. Under some suitable conditions, we show the asymptotic convergence. The results improve and extend the algorithms presented in Byrne (2002) and in Zhao and Yang (2005) and the related convergence theorem
Abstract In this paper, we study the split-feasibility problem in Hilbert spaces by using the projec...
The multiple-set split feasibility problem (MSSFP), as a generalization of the split feasibility pro...
In this paper, we concern with the split feasibility problem (SFP) in real Hilbert space whenever th...
AbstractWe study the multiple-sets split feasibility problem that requires to find a point closest t...
We study the multiple-sets split feasibility problem that requires to find a point closest to a fami...
The paper proposes an inertial accelerated algorithm for solving split feasibility problem with mult...
The goal of this manuscript is to establish strong convergence theorems for inertial shrinking proje...
The convex feasibility problem (CFP) is a classical problem in nonlinear analysis. In this paper, we...
The split feasibility problem SFP has received much attention due to its various applications in sig...
Inspired by the inertial proximal algorithms for finding a zero of a maximal monotone operator, in t...
Abstract. The split feasibility problem has many applications in various fields of science and techn...
In this paper, we first study in a Hilbertian framework the weak convergence of a general Gradient P...
AbstractLet C and Q be nonempty closed convex sets in Rn and Rm, respectively, and A an m by n real ...
Abstract In this paper, we introduce an iterative scheme using the gradient projection method with a...
Due to their extraordinary utility and broad applicability in many areas of classical mathematics an...
Abstract In this paper, we study the split-feasibility problem in Hilbert spaces by using the projec...
The multiple-set split feasibility problem (MSSFP), as a generalization of the split feasibility pro...
In this paper, we concern with the split feasibility problem (SFP) in real Hilbert space whenever th...
AbstractWe study the multiple-sets split feasibility problem that requires to find a point closest t...
We study the multiple-sets split feasibility problem that requires to find a point closest to a fami...
The paper proposes an inertial accelerated algorithm for solving split feasibility problem with mult...
The goal of this manuscript is to establish strong convergence theorems for inertial shrinking proje...
The convex feasibility problem (CFP) is a classical problem in nonlinear analysis. In this paper, we...
The split feasibility problem SFP has received much attention due to its various applications in sig...
Inspired by the inertial proximal algorithms for finding a zero of a maximal monotone operator, in t...
Abstract. The split feasibility problem has many applications in various fields of science and techn...
In this paper, we first study in a Hilbertian framework the weak convergence of a general Gradient P...
AbstractLet C and Q be nonempty closed convex sets in Rn and Rm, respectively, and A an m by n real ...
Abstract In this paper, we introduce an iterative scheme using the gradient projection method with a...
Due to their extraordinary utility and broad applicability in many areas of classical mathematics an...
Abstract In this paper, we study the split-feasibility problem in Hilbert spaces by using the projec...
The multiple-set split feasibility problem (MSSFP), as a generalization of the split feasibility pro...
In this paper, we concern with the split feasibility problem (SFP) in real Hilbert space whenever th...