Exponential Taylor domination

TL;DR

This paper investigates how the valency of an analytic p-valent function's Borel transform is bounded within certain disks, providing bounds, examples, and discussing related Taylor domination concepts.

Contribution

It establishes bounds on the valency of Borel transforms of p-valent functions in disks, linking it to Taylor domination and providing illustrative examples.

Findings

Bounds on valency of Borel transforms in disks larger than 1

Examples demonstrating the bounds are reasonable

Discussion of Taylor domination and its relation to coefficient bounds

Abstract

Let $f(z) = \sum_{k=0}^\infty a_k z^k$ be an analytic function in a disk $D_R$ of radius $R>0$, and assume that $f$ is $p$-valent in $D_R$, i.e. it takes each value $c\in{\mathbb C}$ at most $p$ times in $D_R$. We consider its Borel transform $$ B(f)(z) = \sum_{k=0}^\infty \frac{a_k}{k!} z^k , $$ which is an entire function, and show that, for any $R>1$, the valency of the Borel transform $B(f)$ in $D_R$ is bounded in terms of $p,R$. We give examples, showing that our bounds, provide a reasonable envelope for the expected behavior of the valency of $B(f)$. These examples also suggest some natural questions, whose expected answer will strongly sharper our estimates. We present a short overview of some basic results on multi-valent functions, in connection with "Taylor domination", which, for $f(z) = \sum_{k=0}^\infty a_k z^k$, is a bound of all its Taylor coefficients $a_k$ through the first few of them. Taylor domination is our main technical tool, so we also discuss shortly some recent results in this direction.