Analogs of Hayman’s Theorem and of logarithmic criterion for analytic vector-valued functions in the unit ball having bounded L-index in joint variables

Vita Baksa; Andriy Bandura; Oleh Skaskiv

doi:10.1515/ms-2017-0420

Article

Analogs of Hayman’s Theorem and of logarithmic criterion for analytic vector-valued functions in the unit ball having bounded L-index in joint variables

Vita Baksa , Andriy Bandura and Oleh Skaskiv

Published/Copyright: September 27, 2020

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From the journal Mathematica Slovaca Volume 70 Issue 5

Abstract

In this paper, we present necessary and sufficient conditions of boundedness of L-index in joint variables for vector-valued functions analytic in the unit ball B2={z∈C2:|z|=|z1|2+|z2|2<1}, where L = (l₁, l₂): 𝔹² → R+2 is a positive continuous vector-valued function.

Particularly, we deduce analog of Hayman’s theorem for this class of functions. The theorem shows that in the definition of boundedness of L-index in joint variables for vector-valued functions we can replace estimate of norms of all partial derivatives by the estimate of norm of (p + 1)-th order partial derivative. This form of criteria could be convenient to investigate analytic vector-valued solutions of system of partial differential equations because it allow to estimate higher-order partial derivatives by partial derivatives of lesser order. Also, we obtain sufficient conditions for index boundedness in terms of estimate of modulus of logarithmic derivative in each variable for every component of vector-valued function outside some exceptional set by the vector-valued function L(z).

MSC 2010: Primary 32A10; 32A17; Secondary 32A37

Keywords: bounded index; bounded L-index in joint variables; analytic function; unit ball; local behavior; maximum norm

(Communicated by Tomasz Natkaniec)

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Received: 2019-11-15

Accepted: 2020-02-18

Published Online: 2020-09-27

Published in Print: 2020-10-27

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Articles in the same Issue

https://doi.org/10.1515/ms-2017-0420

Keywords for this article

bounded index; bounded L-index in joint variables; analytic function; unit ball; local behavior; maximum norm