解析函数的ruscheweyh导数生成的一元调和函数

Acta Universitatis Apulensis Pub Date : 1900-01-01 DOI:10.17114/j.aua.2019.59.02

O. Ahuja, Subzar Beig, V. Ravichandran

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引用次数: 0

摘要

对于λ≥0,p > 0和单位圆盘上定义的归一化一元函数f，我们考虑由Tλ，p[f](z) = Dλf(z) + pz(Dλf(z)) ' p+ 1 + Dλf(z) - pz(Dλf(z)) ' p+ 1, z∈D定义的调和函数，其中算子Dλ是我们熟悉的λ- ruscheweyh导数算子。我们得到了函数Tλ，p[f]的一元性、星形性和凸性的几个充分必要条件以及增长估计。本文还给出了上述算子的一个扩展。2010数学学科分类:30C45。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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UNIVALENT HARMONIC FUNCTIONS GENERATED BY RUSCHEWEYH DERIVATIVES OF ANALYTIC FUNCTIONS

For λ ≥ 0, p > 0 and a normalized univalent function f defined on the unit disk D, we consider the harmonic function defined by Tλ,p[f ](z) = Dλf(z) + pz(Dλf(z))′ p+ 1 + Dλf(z)− pz(Dλf(z))′ p+ 1 , z ∈ D, where the operator Dλ is the familiar λ-Ruscheweyh derivative operator. We find some necessary and sufficient conditions for the univalence, starlikeness and convexity as well as the growth estimate of the function Tλ,p[f ]. An extension of the above operator is also given. 2010 Mathematics Subject Classification: 30C45.

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Acta Universitatis Apulensis

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