Measure of relative $(p,q)$-th order based on a growth of composite   entire functions

S. Kanas; S. K. Datta; T. Biswas; G. K. Mondal

arXiv:1607.02105·math.CV·July 8, 2016

Measure of relative $(p,q)$-th order based on a growth of composite entire functions

S. Kanas, S. K. Datta, T. Biswas, G. K. Mondal

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TL;DR

This paper investigates the growth behavior of composite entire functions using a new measure called the relative (p,q)-th order, extending existing results in the field.

Contribution

It introduces a novel measure of growth, the relative (p,q)-th order, for composite entire functions, expanding the theoretical framework of complex analysis.

Findings

01

Derived new growth properties of composite entire functions

02

Extended previous results by J. Tu, Z. X. Chen, and X. M. Zheng

03

Provided theoretical insights into the behavior of entire functions

Abstract

We deduce some growth properties of composite entire functions in the light of their relative $(p, q)$ \ th order by extending some results of J. Tu, Z. X. Chen and X. M. Zheng.

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Taxonomy

TopicsMeromorphic and Entire Functions · Mathematical Dynamics and Fractals