English

On the generalized Zalcman conjecture

Complex Variables 2024-04-16 v2

Abstract

Let S\mathcal{S} denote the class of analytic and univalent ({\it i.e.}, one-to-one) functions f(z)=z+n=2anzn f(z)= z+\sum_{n=2}^{\infty}a_n z^n in the unit disk D={zC:z<1}\mathbb{D}=\{z\in \mathbb{C}:|z|<1\}. For fSf\in \mathcal{S}, In 1999, Ma proposed the generalized Zalcman conjecture that anaman+m1(n1)(m1),\mboxforn2,m2,|a_{n}a_{m}-a_{n+m-1}|\le (n-1)(m-1),\,\,\,\mbox{ for } n\ge2,\, m\ge 2, with equality only for the Koebe function k(z)=z/(1z)2k(z) = z/(1 - z)^2 and its rotations. In the same paper, Ma \cite{Ma-1999} asked for what positive real values of λ\lambda does the following inequality hold? \begin{equation}\label{conjecture} |\lambda a_na_m-a_{n+m-1}|\le \lambda nm -n-m+1 \,\,\,\,\, (n\ge 2, \,m\ge3). \end{equation} Clearly equality holds for the Koebe function k(z)=z/(1z)2k(z) = z/(1 - z)^2 and its rotations. In this paper, we prove the inequality (\ref{conjecture}) for λ=3,n=2,m=3\lambda=3, n=2, m=3. Further, we provide a geometric condition on extremal function maximizing (\ref{conjecture}) for λ=2,n=2,m=3\lambda=2,n=2, m=3.

Keywords

Cite

@article{arxiv.2209.10595,
  title  = {On the generalized Zalcman conjecture},
  author = {Vasudevarao Allu and Abhishek Pandey},
  journal= {arXiv preprint arXiv:2209.10595},
  year   = {2024}
}

Comments

Revised version, accepted for publication in Annali di Matematica Pura ed Applicata (1923 -), 11 Pages

R2 v1 2026-06-28T01:50:53.937Z