A strong convergence algorithm for approximating a common solution of variational inequality and fixed point problems in real Hilbert space

O. Oyewole, Mebawondu Akindele Adebayo, O. Mewomo
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Abstract

In this paper, we propose an iterative algorithm for approximating a common solution of a variational inequality and fixed-point problem. The algorithm combines the subgradient extragradient technique, inertial method and a modified viscosity approach. Using this algorithm, we state and prove a strong convergence algorithm for obtaining a common solution of a pseudomonotone variational inequality problem and fixed-point of an η-demimetric mapping in a real Hilbert space. We give an application of this result to some theoretical optimization problems. Furthermore, we report some numerical examples to show the efficiency of our method by comparing it with previous methods in the literature. Our result extends, improves and unifies many other results in this direction in the literature. Mathematics Subject Classification (2010): 47H09, 49J35, 90C47. Received 21 May 2021; Accepted 14 July 2021
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逼近实希尔伯特空间中变分不等式和定点问题常见解的强收敛算法
本文提出了一种迭代算法,用于逼近变分不等式和定点问题的共同解。该算法结合了子梯度外梯度技术、惯性方法和改进的粘性方法。利用该算法,我们提出并证明了一种强收敛算法,用于获得伪单调变分不等式问题的公共解和实希尔伯特空间中η-度量映射的定点。我们将这一结果应用于一些理论优化问题。此外,我们还报告了一些数值示例,通过与以往文献中的方法进行比较,展示了我们方法的效率。我们的结果扩展、改进并统一了文献中该方向的许多其他结果:47H09, 49J35, 90C47.2021 年 5 月 21 日收到;2021 年 7 月 14 日接受
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