Sharp Bohr radius involving Schwarz functions for certain classes of analytic functions

TL;DR

This paper determines sharp improved Bohr radii for classes of analytic functions constrained by differential subordinations involving Janowski functions, with results expressed via Bessel functions, extending previous work with sharper bounds.

Contribution

It introduces new sharp bounds for the Bohr radius for functions satisfying specific differential subordinations involving Janowski functions, extending existing results with improved precision.

Findings

Derived sharp Bohr radius bounds for functions with differential subordination constraints.

Expressed the Bohr radius in terms of roots of equations involving Bessel functions.

Extended results to classes like α-convex and typically real functions.

Abstract

The Bohr radius for an arbitrary class $\mathcal{F}$ of analytic functions of the form $f(z)=\sum_{n=0}^{\infty}a_nz^n$ on the unit disk $\mathbb{D}=\{z\in\mathbb{C} : |z|<1\}$ is the largest radius $R_{\mathcal{F}}$ such that every function $f\in\mathcal{F}$ satisfies the inequality \begin{align*} d\left(\sum_{n=0}^{\infty}|a_nz^n|, |f(0)|\right)=\sum_{n=1}^{\infty}|a_nz^n|\leq d(f(0), \partial f(\mathbb{D})), \end{align*} for all $|z|=r\leq R_{\mathcal{F}}$ , where $d(0, \partial f(\mathbb{D}))$ is the Euclidean distance. In this paper, our aim is to determine the sharp improved Bohr radius for the classes of analytic functions $f$ satisfying differential subordination relation $zf^{\prime}(z)/f(z)\prec h(z)$ and $f(z)+\beta zf^{\prime}(z)+\gamma z^2f^{\prime\prime}(z)\prec h(z)$, where $h$ is the Janowski function. We show that improved Bohr radius can be obtained for Janowski functions as root of an equation involving Bessel function of first kind. Analogues results are obtained in this paper for $\alpha$-convex functions and typically real functions, respectively. All obtained results in the paper are sharp and are improved version of [{Bull. Malays. Math. Sci. Soc.} (2021) 44:1771-1785].