Entire functions of minimal growth with prescribed zeros

I.V. Andrusyak; P.V. Filevych

doi:10.15330/cmp.16.2.484-499

Authors

I.V. Andrusyak Lviv Polytechnic National University, 5 Mytropolyt Andrei str., 79013, Lviv, Ukraine https://orcid.org/0000-0001-6601-4374
P.V. Filevych Lviv Polytechnic National University, 5 Mytropolyt Andrei str., 79013, Lviv, Ukraine https://orcid.org/0000-0002-1250-8907

https://doi.org/10.15330/cmp.16.2.484-499

Keywords:

entire function, maximum modulus, Nevanlinna characteristic, zero, counting function

Published online: 2024-11-22

Abstract

Let $l$ be a positive continuous increasing to $+\infty$ function on $\mathbb{R}$ . For a positive non-decreasing on $\mathbb{R}$ function $h$ , we found sufficient and necessary conditions under which, for an arbitrary complex sequence $(\zeta_n)$ such that $\zeta_n\to\infty$ as $n\to\infty$ and $\ln n(r)\ge l(\ln r)$ for all sufficiently large $r$ , there exists an entire function $f$ whose zeros are the $\zeta_n$ (with multiplicities taken into account) satisfying $\ln\ln M(r)=o\big(l^{-1}(\ln n(r))\ln n_{\zeta}(r)h(\ln n(r))\big),\quad r\notin E,\ r\to+\infty,$ where $E\subset[1,+\infty)$ is a set of finite logarithmic measure. Here, $n(r)$ is the counting function of the sequence $(\zeta_n)$ , and $M(r)$ is the maximum modulus of the function $f$ .

Entire functions of minimal growth with prescribed zeros

Authors

Keywords:

Abstract

Most read articles by the same author(s)

Make a Submission

Language

browse

Information