Convergence and Stability of Iterative Scheme for a Monotone Total Asymptotically Non-expansive Mapping

Authors

  • SalwaSalwa Salman Abed Department of Mathematics, College of Education for Pure Science Ibn Al Haitham, University of Baghdad, Iraq
  • Athraa Najeb Abed Department of Mathematics, College of Education for Pure Science Ibn Al Haitham, University of Baghdad, Iraq

DOI:

https://doi.org/10.24996/ijs.2022.63.1.25

Keywords:

Banach Space, Monotone Mappings, Total Asymptotically Non-expansive Mapping, Fixed Points

Abstract

    In this work, we introduce Fibonacci– Halpern iterative scheme ( FH scheme) in partial ordered Banach space (POB space) for monotone total asymptotically non-expansive mapping (, MTAN mapping) that defined on weakly compact convex subset.  We also  discuss the results of weak and strong convergence for this scheme.

 Throughout  this work, compactness condition of m-th iterate  of the mapping for some natural m is necessary to ensure strong convergence, while Opial's condition has been employed to show weak convergence. Stability of FH scheme is also  studied. A numerical comparison is provided by an example to show that FH scheme is faster than Mann and Halpern iterative schemes.

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Published

2022-01-30

Issue

Section

Mathematics

How to Cite

Convergence and Stability of Iterative Scheme for a Monotone Total Asymptotically Non-expansive Mapping. (2022). Iraqi Journal of Science, 63(1), 241-250. https://doi.org/10.24996/ijs.2022.63.1.25

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