Bi-Univalent Function Families Involving q-Rabotnov Function and q-Analogues of Fibonacci Numbers

Authors

  • Abdullah Alsoboh
  • Ahmad Almalkawi Modern College of Business and Science, Muscat, Sultanate of Oman
  • Ala Amourah Mathematics Education Program, Faculty of Education and Arts, Sohar University, Sohar 311, Oman
  • Fahad Al Abri Department of Basic and Applied Sciences, College of Applied and Health Sciences, A’Sharqiyah University, Post Box No. 42, Post Code No. 400, Ibra, Sultanate of Oman
  • Tala Sasa Applied Science Research Center, Applied Science Private University, Amman, Jordan

DOI:

https://doi.org/10.29020/nybg.ejpam.v19i1.7113

Keywords:

Analytic functions, Univalent functions, Fibonacci numbers, Fekete–Szegö, $\q$-Rabotnov Function

Abstract

 Motivated by the interplay between $\q$-calculus and geometric function theory, this paper introduces and investigates a new subclass of bi-univalent functions associated with shell-like curves defined via the $\q$-Rabotnov function and the $\q$-analogue of Fibonacci numbers. By employing the subordination principle, we derive coefficient bounds for the initial Taylor--Maclaurin coefficients, specifically $|a_{2}|$ and $|a_{3}|$, and further establish sharp Fekete--Szegö type inequalities for the proposed function class.   Our results not only extend and generalize several recent contributions in the theory of bi-univalent functions but also highlight novel connections between $\q$-special functions, shell-like domains, and analytic inequalities. The findings presented herein contribute to a deeper understanding of the structural properties of bi-univalent functions and open avenues for future applications in operator theory and related analytic frameworks.

Downloads

Published

2026-02-16

Issue

Vol. 19 No. 1: (January 2026)

Section

Complex Analysis

License

Copyright (c) 2026 Abdullah Alsoboh, Ahmad Almalkawi, Ala Amourah, Fahad Al Abri, Tala Sasa

Creative Commons License

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

Upon acceptance of an article by the European Journal of Pure and Applied Mathematics, the author(s) retain the copyright to the article. However, by submitting your work, you agree that the article will be published under the Creative Commons Attribution-NonCommercial 4.0 International License (CC BY-NC 4.0). This license allows others to copy, distribute, and adapt your work, provided proper attribution is given to the original author(s) and source. However, the work cannot be used for commercial purposes.

By agreeing to this statement, you acknowledge that:

  • You retain full copyright over your work.
  • The European Journal of Pure and Applied Mathematics will publish your work under the Creative Commons Attribution-NonCommercial 4.0 International License (CC BY-NC 4.0).
  • This license allows others to use and share your work for non-commercial purposes, provided they give appropriate credit to the original author(s) and source.

How to Cite

Bi-Univalent Function Families Involving q-Rabotnov Function and q-Analogues of Fibonacci Numbers. (2026). European Journal of Pure and Applied Mathematics, 19(1), 7113. https://doi.org/10.29020/nybg.ejpam.v19i1.7113