Logarithmic coefficients of the inverse of univalent functions

TL;DR

This paper investigates the bounds of logarithmic inverse coefficients for univalent functions and their subclasses, providing sharp bounds for the general class and specific subclasses like convex functions.

Contribution

It determines the sharp bounds of logarithmic inverse coefficients for the class of univalent functions and explores bounds for important subclasses such as convex functions.

Findings

Sharp bound for mma_n(F) for all n  in s

Bound mma_n(F) 2 1/(2n) for convex functions for n=1,2,3

Results are sharp for specific functions like l(z)=z/(1-z)

Abstract

Let $\es$ be the class of analytic and univalent functions in the unit disk $|z|<1$, that have a series of the form $f(z)=z+ \sum_{n=2}^{\infty}a_nz^n$. Let $F$ be the inverse of the function $f\in\es$ with the series expansion %in a disk of radius at least $1/4$ $F(w)=f^{-1}(w)=w+ \sum_{n=2}^{\infty}A_nw^n$ for $|w|<1/4$. The logarithmic inverse coefficients $\Gamma_n$ of $F$ are defined by the formula $\log\left(F(w)/w\right)\,=\,2\sum_{n=1}^{\infty}\Gamma_n(F)w^n$. % In this paper, we determine the logarithmic inverse coefficients bound of $F$ for the class In this paper, we first determine the sharp bound for the absolute value of $\Gamma_n(F)$ when $f$ belongs to $\es$ and for all $n \geq 1$. This result motivates us to carry forward similar problems for some of its important geometric subclasses. In some cases, we have managed to solve this question completely but in some other cases it is difficult to handle for $n\geq 4$. For example, in the case of convex functions $f$, we show that the logarithmic inverse coefficients $\Gamma_n(F)$ of $F$ satisfy the inequality \[ |\Gamma_n(F)|\,\le \, \frac{1}{2n} \mbox{ for } n\geq 1,2,3 \] and the estimates are sharp for the function $l(z)=z/(1-z)$. Although this cannot be true for $n\ge 10$, it is not clear whether this inequality could still be true for $4\leq n\leq 9$.