Solving a Split Feasibility Problem by the Strong Convergence of Two Projection Algorithms in Hilbert Spaces

Hasanen A. Hammad; Habib Ur Rehman; Yae Ulrich Gaba

doi:10.1155/2021/5562694

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Solving a Split Feasibility Problem by the Strong Convergence of Two Projection Algorithms in Hilbert Spaces

Journal article

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Solving a Split Feasibility Problem by the Strong Convergence of Two Projection Algorithms in Hilbert Spaces

Hasanen A. Hammad, Habib Ur Rehman and Yae Ulrich Gaba

Journal of function spaces, Vol.2021, pp.1-11

2021

DOI: https://doi.org/10.1155/2021/5562694

Abstract

Mathematics

Mathematics, Applied

Physical Sciences

Science & Technology

The goal of this manuscript is to establish strong convergence theorems for inertial shrinking projection and CQ algorithms to solve a split convex feasibility problem in real Hilbert spaces. Finally, numerical examples were obtained to discuss the performance and effectiveness of our algorithms and compare the proposed algorithms with the previous shrinking projection, hybrid projection, and inertial forward-backward methods.

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Title: Solving a Split Feasibility Problem by the Strong Convergence of Two Projection Algorithms in Hilbert Spaces
Creators - without role: Hasanen A. Hammad - Sohag University
Habib Ur Rehman - Department of Mathematics, Monglkuts University of Technology, Bangkok 10140, Thailand
Yae Ulrich Gaba - Sefako Makgatho Health Sciences University
Publication Details: Journal of function spaces, Vol.2021, pp.1-11
Publisher: Hindawi Publishing Group
Number of pages: 11
Grant note: Carnegie Corporation of New York through the African Institute for Mathematical Sciences
Identifiers: 9928480008331
Academic Unit: Qassim University
Language: English
Resource Type: Journal article