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Convergence analysis and applications of the inertial algorithm solving inclusion problems
- Authors
- Tang, Yan; Lin, Honghua; Gibali, Aviv; Cho, Yeol Je
- Issue Date
- May-2022
- Publisher
- Elsevier BV
- Keywords
- Monotone operator equation; Fixed point; Forward-backward algorithm; Inertial technique; Nonexpansive mapping
- Citation
- Applied Numerical Mathematics, v.175, pp 1 - 17
- Pages
- 17
- Indexed
- SCIE
SCOPUS
- Journal Title
- Applied Numerical Mathematics
- Volume
- 175
- Start Page
- 1
- End Page
- 17
- ISSN
- 0168-9274
1873-5460
- Abstract
- Nonlinear operator theory is an important area of nonlinear functional analysis. This area encompasses diverse nonlinear problems in many areas of mathematics, the physical sciences and engineering such as monotone operator equations, fixed point problems and more. In this work we are concern with the problem of finding a common solution of a monotone operator equation and fixed point of a nonexpansive mapping in real Hilbert spaces. Derived from dynamical systems, a simple inertial forward-backward splitting method for solving the problem is presented and analyzed under mild and standard assumptions. Some numerical examples in real-world and comparisons with related works, illustrate the theoretical advantages as well the potential applicability of the proposed scheme. (c) 2022 IMACS. Published by Elsevier B.V. All rights reserved.
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