CLASS OF ANALYTIC FUNCTION DEFINED BY NEUTROSOPHIC POISSON DISTRIBUTION

Authors

  • Olushola ADEYEMO Department of Pure and Applied Mathematics, Ladoke Akintola University of Technology Ogbomoso, P.M.B. 4000, Oyo State Nigeria
  • Sayo Abidemi GBANGBALA Department of Pure and Applied Mathematics, Ladoke Akintola University of Technology Ogbomoso, P.M.B. 4000, Oyo State Nigeria.
  • Adeniyi Abimbola AYENI Department of Mathematics, Federal College of Education (Special), Oyo Nigeria.
  • Folorunso Isola AKINWALE Department of Pure and Applied Mathematics, Ladoke Akintola University of Technology Ogbomoso, P.M.B. 4000, Oyo State Nigeria.
  • Abel Onaolapo AREMU National University San Diego California, USA

Keywords:

Univalent function, Ma-Minda function, Stirling number of second kind, Neutrosophic Poisson Distribution

Abstract

This article investigates the interplay between univalent functions, the 
Salagean operator, and Poisson distribution within the framework of 
neutrosophic distribution and neutrosophic Poisson distribution. We introduce 
new subclasses of analytic functions, leveraging the Ma-Minda class and 
utilizing the Salagean operator. Furthermore, we explore the application of 
Poisson distribution and neutrosophic Poisson distribution in defining these 
subclasses. The coefficient bounds and other significant properties of the 
defined class was also derived by using second form of Stirling numbers with 
decreasing factorial. 

 

DOI 10.5281/zenodo.17612797

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Published

2026-03-25

Issue

Vol. 97 (2026): Neutrosophic Sets and Systems

Section

Article

License

Copyright (c) 2025 Neutrosophic Sets and Systems

Creative Commons License

This work is licensed under a Creative Commons Attribution 4.0 International License.

 Creative Commons Attribution (CC BY) license.

How to Cite

Olushola ADEYEMO, Sayo Abidemi GBANGBALA, Adeniyi Abimbola AYENI, Folorunso Isola AKINWALE, & Abel Onaolapo AREMU. (2026). CLASS OF ANALYTIC FUNCTION DEFINED BY NEUTROSOPHIC POISSON DISTRIBUTION. Neutrosophic Sets and Systems, 97, 602-622. https://fs.unm.edu/nss8/index.php/111/article/view/7464