希尔伯特空间中分割平等变分不等式、变分包容和多集定点问题的强收敛性及其应用

IF 1.5 3区数学 Q1 MATHEMATICS

Journal of Inequalities and Applications Pub Date : 2024-03-25 DOI:10.1186/s13660-024-03118-0

Charu Batra, Renu Chugh, Rajeev Kumar, Khaled Suwais, Sally Almanasra, Nabil Mlaiki

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引用次数: 0

摘要

本文介绍了一种创新的惯性同步循环迭代算法，旨在解决分裂相等变分不等式领域的一系列数学问题。具体来说，该算法适用于有限族的分裂相等变分不等式问题、无限族的分裂相等变分包容问题，以及涉及无穷维希尔伯特空间中去收缩算子的多集分裂相等定点问题。该算法整合了各种成熟的方法，包括循环法、惯性法、粘度逼近法和投影法。我们确定了这一拟议算法的强收敛性，证明了它在各种情况下的适用性，并统一了现有文献中的不同结论。此外，我们还提供了一个数值示例来验证主要收敛定理。

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Strong convergence of split equality variational inequality, variational inclusion, and multiple sets fixed point problems in Hilbert spaces with application

This paper introduces an innovative inertial simultaneous cyclic iterative algorithm designed to address a range of mathematical problems within the realm of split equality variational inequalities. Specifically, the algorithm accommodates finite families of split equality variational inequality problems, infinite families of split equality variational inclusion problems, and multiple-sets split equality fixed point problems involving demicontractive operators in infinite-dimensional Hilbert spaces. The algorithm integrates well-established methods, including the cyclic method, the inertial method, the viscosity approximation method, and the projection method. We establish the strong convergence of this proposed algorithm, demonstrating its applicability in various scenarios and unifying disparate findings from existing literature. Additionally, a numerical example is presented to validate the primary convergence theorem.

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来源期刊

Journal of Inequalities and Applications 数学-数学

自引率

6.20%

发文量

136

期刊介绍： The aim of this journal is to provide a multi-disciplinary forum of discussion in mathematics and its applications in which the essentiality of inequalities is highlighted. This Journal accepts high quality articles containing original research results and survey articles of exceptional merit. Subject matters should be strongly related to inequalities, such as, but not restricted to, the following: inequalities in analysis, inequalities in approximation theory, inequalities in combinatorics, inequalities in economics, inequalities in geometry, inequalities in mechanics, inequalities in optimization, inequalities in stochastic analysis and applications.