Approximation of an Inertial Iteration Method for a Set-Valued Quasi Variational Inequality

Mohammad Akram

doi:10.52866/ijcsm.2024.05.02.007

Approximation of an Inertial Iteration Method for a Set-Valued Quasi Variational Inequality

Authors

Mohammad Akram Department of Mathematics, Faculty of Science, Islamic University of Madinah, 42351, Madinah, Saudi Arabia https://orcid.org/0000-0003-1416-5351

DOI:

https://doi.org/10.52866/ijcsm.2024.05.02.007

Keywords:

Set-valued quasi variational inequality; inertial iterative algorithm; strong convergence; Weiner-Hopf equation

Abstract

In this article, a projection type two step inertial iterative scheme for investigating set-valued quasi
variational inequality in real Banach spaces is designed. We manifest the existence result and verified by an illustrative
example. Also, we estimate the approximate solution of a set-valued quasi variational inequality by analyzing the
convergence of the proposed inertial iterative algorithm. Further, an extended Weiner-Hopf equation is considered
and substantiated that it is analogous to the extended set-valued quasi variational inequality. Finally, we investigate
the extended Weiner-Hopf equation by analyzing the convergence of the composed iterative scheme.

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Published

2024-03-27

How to Cite

[1]

Mohammad Akram, “Approximation of an Inertial Iteration Method for a Set-Valued Quasi Variational Inequality”, Iraqi Journal For Computer Science and Mathematics, vol. 5, no. 2, pp. 68–80, Mar. 2024.