Sets non-thin at \infty in \Bbb C ^m, and the growth of sequences of entire functions of genus zero

TL;DR

This paper introduces a new concept of non-thinness at infinity in complex spaces, explores its properties, and applies it to extend existing results on entire functions of genus zero.

Contribution

It defines non-thin at infinity in {C}^m, studies its properties, and extends previous results on the growth of sequences of entire functions of genus zero.

Findings

Non-thin at infinity is preserved under certain set operations.

The concept extends previous results on entire functions.

Applications to growth estimates of entire function sequences.

Abstract

In this paper we define the notion of non-thin at $\infty$ as follows: Let $E$ be a subset of $\Bbb C^m$. For any $R>0$ define $E_R=E\cap \{z\in \Bbb C ^m :|z|\leq R\}$. We say that $E$ is non-thin at $\infty$ if \lim_{R\to\infty}V_{E_R}(z)=0 for all $z\in \Bbb C^m$, where $V_E$ is the pluricomplex Green function of $E$. This definition of non-thin at $\infty$ has good properties: If $E\subset \Bbb C^m$ is non-thin at $\infty$ and $A$ is pluripolar then $E\backslash A$ is non-thin at $\infty$, if $E\subset \Bbb C^m$ and $F\subset \Bbb C^n$ are closed sets non-thin at $\infty$ then $E\times F\subset \Bbb C^m\times \Bbb C^n$ is non-thin at $\infty$ (see Lemma \ref{Lem1}). Then we explore the properties of non-thin at $\infty$ sets and apply this to extend the results in \cite{mul-yav} and \cite{trong-tuyen}.