Coefficient bounds for starlike functions associated with Gregory coefficients
Abstract
It is of interest to know the sharp bounds of the Hankel determinant, Zalcman functionals, Fekete-Szeg inequality as a part of coefficient problems for different classes of functions. Let be the class of functions which are holomorphic in the open unit disk of the form \begin{align*} f(z)=z+\sum_{n=2}^{\infty}a_nz^n\; \mbox{for}\; z\in\mathbb{D} \end{align*} and suppose that \begin{align*} F_{f}(z):=\log\dfrac{f(z)}{z}=2\sum_{n=1}^{\infty}\gamma_{n}(f)z^n, \;\; z\in\mathbb{D},\;\;\log 1:=0, \end{align*} where is the logarithmic coefficients. The second Hankel determinant of logarithmic coefficients is defined as: , where and are the first, second and third logarithmic coefficients of functions belonging to the class of normalized univalent functions. In this article, we first establish sharp inequalities with logarithmic coefficients for the classes of starlike functions associated with Gregory coefficients. In addition, we establish the sharpness of Fekete-Szeg inequality, Zalcman functional and generalized Zalcman functional for the class starlike functions associated with Gregory coefficients.
Cite
@article{arxiv.2412.09127,
title = {Coefficient bounds for starlike functions associated with Gregory coefficients},
author = {Molla Basir Ahamed and Sanju Mandal},
journal= {arXiv preprint arXiv:2412.09127},
year = {2024}
}
Comments
17 pages, 1 figure