Fixed Point Property of Variable Exponent Cesaro Complex Function Space of Formal Power Series under Premodular

Awad A. Bakery; Elsayed A. E. Mohamed

doi:10.1155/2022/3811326

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Fixed Point Property of Variable Exponent Cesaro Complex Function Space of Formal Power Series under Premodular

Journal article

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Peer reviewed

Fixed Point Property of Variable Exponent Cesaro Complex Function Space of Formal Power Series under Premodular

Awad A. Bakery and Elsayed A. E. Mohamed

Journal of function spaces, Vol.2022, pp.1-22

26/03/2022

DOI: https://doi.org/10.1155/2022/3811326

Abstract

Mathematics

Mathematics, Applied

Physical Sciences

Science & Technology

We have defined the variable exponent of the Cesaro complex function space of formal power series. We have constructed the prequasi-ideal generated by s-numbers and this new space of complex functions. We present some topological and geometric structures of this class of ideal. The existence of Caristi's fixed point is examined. Some geometric properties related to the fixed point theory are presented. Finally, real-world examples and applications show solutions to some nonlinear difference equations.

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Title: Fixed Point Property of Variable Exponent Cesaro Complex Function Space of Formal Power Series under Premodular
Creators - without role: Awad A. Bakery - Jeddah University
Elsayed A. E. Mohamed - Univ Jeddah, Dept Math, Coll Sci & Arts Khulis, Jeddah, Saudi Arabia
Publication Details: Journal of function spaces, Vol.2022, pp.1-22
Publisher: Hindawi Publishing Group
Number of pages: 22
Grant note: UJ-21-DR-76 / University of Jeddah, Saudi Arabia
Identifiers: 9932918508331
Academic Unit: University of Jeddah
Language: English
Resource Type: Journal article