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https://hdl.handle.net/10321/5438
Title: | An inertial iterative method for solving split monotone inclusion problems in Hilbert spaces | Authors: | Mebawondu, Akindele Adebayo Sunday, Akunna Sunsan Narain, Ojen Kumar Maharaj, Adhir |
Keywords: | Hilbert Spaces;0102 Applied Mathematics;0103 Numerical and Computational Mathematics;4901 Applied mathematics;Iterative method;Split monotone inclusion problem;Hilbert space;Lipschitz | Issue Date: | 2024 | Publisher: | American Institute of Mathematical Sciences (AIMS) | Source: | Mebawondu, A.A. et al. 2024. An inertial iterative method for solving split monotone inclusion problems in Hilbert spaces. Numerical Algebra, Control and Optimization: 1-19. doi:10.3934/naco.2024039 | Journal: | Numerical Algebra, Control and Optimization | Abstract: | The purpose of this work is to introduce and study a new type of a relaxed extrapolation iterative method for approximating the solution of a split monotone inclusion problem in the framework of Hilbert spaces. More so, we establish a strong convergence theorem of the proposed iterative method under the assumption that the set-valued operator is maximal monotone and the single-valued operator is Lipschitz continuous monotone which is weaker assumption unlike other methods in which the single-valued is inverse strongly monotone. We emphasize that the value of the Lipschitz constant is not re- quired for the iterative technique to be implemented, and during computation, the Lipschitz continuity was not used. Lastly, we present an application and also some numerical experiments to show the e ciency and the applicability of our proposed iterative method. |
URI: | https://hdl.handle.net/10321/5438 | ISSN: | 2155-3289 2155-3297 (Online) |
DOI: | 10.3934/naco.2024039 |
Appears in Collections: | Research Publications (Applied Sciences) |
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NACO Copyright Clearance.docx | 147.87 kB | Microsoft Word XML | View/Open | |
Mebawondu_Maharaj et al_2020.pdf | 449.17 kB | Adobe PDF | View/Open |
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