DOI: 10.24193/fpt-ro.2022.1.22

Authors: B. Djafari-Rouhani, K.R. Kazmi, S. Moradi, Rehan Ali and S.A. Khan

Abstract: This paper deals with a split equality hierarchical fixed point problem in real Hilbert spaces which is an important and natural extension of hierarchical fixed point problem and split equality fixed point problem. An iterative algorithm where the stepsizes do not depend on the operator norms, so called simultaneous Krasnoselski-Mann algorithm is suggested for solving the split equality hierarchical fixed point problem. Further we prove a weak convergence theorem for the sequence generated by this algorithm. This special aspect of the algorithm together with the convergence result makes it an interesting scheme. Furthermore, we give some examples to justify the main result. Finally, we show that our purposed iterative algorithm is more efficient than some other known iterative algorithms. On the other hand, the framework is general and allows us to treat in a unified way several iterative algorithms, recovering, developing and improving some recently known related convergence results in the literature.

Key Words and Phrases: Split equality hierarchical fixed point problem, split equality fixed point problem, maximal monotone operator, simultaneous Krasnoselski-Mann algorithm, weak convergence, weak convergence.

2010 Mathematics Subject Classification: 47H09, 47H10, 47J25, 54H25.

Published on-line: February 1st, 2022.

Abstract pdf          Fulltext pdf

Back to volume's table of contents