Sharp bounds of the fekete-szego problem and second hankel determinant for certain bi-univalent functions defined by a novel q-differential operator associated with q-limacon domain
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Date
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Volume Title
Publisher
MDPI
Access Rights
info:eu-repo/semantics/openAccess
Abstract
In this present paper, we define a new operator in conjugation with the basic (or q-) calculus. We then make use of this newly defined operator and define a new class of analytic and bi-univalent functions associated with the q-derivative operator. Furthermore, we find the initial Taylor-Maclaurin coefficients for these newly defined function classes of analytic and bi-univalent functions. We also show that these bounds are sharp. The sharp second Hankel determinant is also given for this newly defined function class.
Description
Keywords
Fekete-Szego inequality, starlike function, Hankel determinant, Bi-univalent functions, q-limacon domain
Journal or Series
Fractal And Fractıonal
WoS Q Value
Scopus Q Value
Volume
7
Issue
7
Citation
Shaba, TG, Araci, S , Adebesin, BO, Tchier, F, Zainab, & Khan, B . (JUL 2023). Sharp bounds of the fekete-szego problem and second hankel determinant for certain bi-univalent functions defined by a novel q-differential operator associated with q-limacon domain . Fractal And Fractıonal . (7, 7 ss.) . https://doi.org/10.3390/fractalfract7070506 .
