AbstractThe weak and strong convergence of a sequence generated by a Mann-type iteration are investigated in the frame of a real Hilbert space. Some applications to the projection method for the convex feasibility problem are given
Abstract: The Mann iterations for nonexpansive mappings have only weak convergence even in a Hilbert...
AbstractIn this paper, we introduce a modified Mann iterative process for approximating a common fix...
In this paper, we present two Douglas–Rachford inspired iteration schemes which can be applied direc...
Due to their extraordinary utility and broad applicability in many areas of classical mathematics an...
In this paper we consider a projection method for convex feasibility problem that is known to conver...
In this paper we consider a projection method for convex feasibility problem that is known to conver...
In this paper we consider a projection method for convex feasibility problem that is known to conver...
In this paper we consider a projection method for convex feasibility problem that is known to conver...
In this paper we consider a projection method for convex feasibility problem that is known to conver...
AbstractThis paper surveys some of the main convergence properties of the Mann-type iteration for th...
The purpose of this note is to present an explicit iteration method that converges strongly for solv...
In a stochastic convex feasibility problem connected with a complete probability space (Omega, A, mu...
Abstract. C be a closed convex subset of a real Hilbert space H and assume that Ti is Strictly asymp...
AbstractLet C be a bounded closed convex nonempty subset of a (real) Hilbert space H. The idea of a ...
In this paper we present two Douglas–Rachford inspired iteration schemes which can be applied direct...
Abstract: The Mann iterations for nonexpansive mappings have only weak convergence even in a Hilbert...
AbstractIn this paper, we introduce a modified Mann iterative process for approximating a common fix...
In this paper, we present two Douglas–Rachford inspired iteration schemes which can be applied direc...
Due to their extraordinary utility and broad applicability in many areas of classical mathematics an...
In this paper we consider a projection method for convex feasibility problem that is known to conver...
In this paper we consider a projection method for convex feasibility problem that is known to conver...
In this paper we consider a projection method for convex feasibility problem that is known to conver...
In this paper we consider a projection method for convex feasibility problem that is known to conver...
In this paper we consider a projection method for convex feasibility problem that is known to conver...
AbstractThis paper surveys some of the main convergence properties of the Mann-type iteration for th...
The purpose of this note is to present an explicit iteration method that converges strongly for solv...
In a stochastic convex feasibility problem connected with a complete probability space (Omega, A, mu...
Abstract. C be a closed convex subset of a real Hilbert space H and assume that Ti is Strictly asymp...
AbstractLet C be a bounded closed convex nonempty subset of a (real) Hilbert space H. The idea of a ...
In this paper we present two Douglas–Rachford inspired iteration schemes which can be applied direct...
Abstract: The Mann iterations for nonexpansive mappings have only weak convergence even in a Hilbert...
AbstractIn this paper, we introduce a modified Mann iterative process for approximating a common fix...
In this paper, we present two Douglas–Rachford inspired iteration schemes which can be applied direc...
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