On the (p, q)-Lucas polynomial coefficient bounds of the bi-univalent function class sigma

No Thumbnail Available

Date

2019-11

Authors

Journal Title

Journal ISSN

Volume Title

Publisher

Springer

Abstract

The idea of the present paper stems from the work of Lee and Ac (J Appl Math 2012:1-18, 2012). We want to remark explicitly that, in our article, by using the (p, q)-Lucas polynomials, our methodology builds a bridge, to our knowledge not previously well known, between the Theory of Geometric Functions and that of Special Functions, which are usually considered as very different fields. Thus, we aim at introducing a new class of bi-univalent functions defined through the (p, q)-Lucas polynomials. Furthermore, we derive coefficient inequalities and obtain Fekete-Szego problem for this new function class.

Description

Keywords

(p, q)-Lucas polynomials, Coefficient bounds, Bi-univalent functions, Subclass, Fibonacci

Citation

Altınkaya, S. ve Yalçın, S. (2019). ''On the (p, q)-Lucas polynomial coefficient bounds of the bi-univalent function class sigma''. Boletin de la Sociedad Matematica Mexicana, 25(3), 567-575.