A projected fixed point algorithm with Meir-Keeler contraction for pseudocontractive mappings

In our paper, we propose two new iterative algorithms with Meir–Keeler contractions that are based on Tseng’s method, the multi-step inertial method, the hybrid projection method, and the shrinking projection method to solve a monotone variational inclusion problem in Hilbert spaces. The strong convergence of the proposed iterative algorithms is proven. Using our results, we can solve convex minimization problems.

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A projected fixed point algorithm with Meir-Keeler contraction for pseudocontractive mappings

Abstract: In this paper, we introduce a projected algorithm with Meir-Keeler contraction for finding the fixed points of the pseudocontractive mappings. We prove that the presented algorithm converges strongly to the fixed point of the pseudocontractive mapping in Hilbert spaces.

Cited by 2 publications

References 28 publications

An algorithm for solving a class of accretive variational inequalities involving pseudo-contractions

An algorithm for solving a class of accretive variational inequalities involving pseudo-contractions

Multi-Step Inertial Hybrid and Shrinking Tseng’s Algorithm with Meir–Keeler Contractions for Variational Inclusion Problems

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