On deviations and maximum points of algebroid functions of finite lower order

Arnold Kowalski; Ivan Marchenko

doi:10.2996/kmj44103

Abstract

We consider the influence of the number of separated maximum points and Valiron deficiency over the magnitude of Petrenko's deviation of algebroid functions of finite lower order. Presented results are the generalization of Petrenko's and Niino's results. We also give examples showing that the estimates are sharp.

Citation

Download Citation

Arnold Kowalski. Ivan Marchenko. "On deviations and maximum points of algebroid functions of finite lower order." Kodai Math. J. 44 (1) 47 - 68, March 2021. https://doi.org/10.2996/kmj44103

Information

Received: 25 November 2019; Revised: 15 May 2020; Published: March 2021

First available in Project Euclid: 23 March 2021

Digital Object Identifier: 10.2996/kmj44103

Subjects:

Primary: 30D35 , 32H30

Secondary: 30D30 , 32A22

Keywords: Algebroid function , deviation‎ , maximum points , subharmonic function

Abstract

Citation

Information

KEYWORDS/PHRASES

PUBLICATION TITLE:

PUBLICATION YEARS