Alexander积分算子的广义算子

Pub Date : 2020-11-01 DOI:10.2478/ausm-2020-0021

H. Güney, S. Owa

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引用次数: 0

摘要

摘要:设Tn为一类函数f，该类函数f由幂级数f(z)=z+an+1zn+1+an2zn+2+…f \left (z \right)=z+ {a＿n{ +}}{1z ^{n +1}}+{ a＿n2z}^{n +2+{}}\ldots对封闭单位圆盘 \bar{\mathbb{U}}中的每一个z定义。有m个不同的边界点zs， (s = 1,2，…，m)，我们考虑αm∈eiβ - j−λf()，这里- j−λ是广义Alexander积分算子，是开单位圆盘。应用φ - j−λ，得到一个子类Bn(αm，β，ρ;n的j， λ)用函数f的分数积分来定义。本文的目的是考虑f在Bn(αm，β，ρ;J， λ)

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Generalized operator for Alexander integral operator

Abstract Let Tn be the class of functions f which are defined by a power series f(z)=z+an+1zn+1+an2zn+2+…f\left( z \right) = z + {a_{n + 1}}{z^{n + 1}} + {a_n}2{z^{n + 2}} + \ldots for every z in the closed unit disc 𝕌¯\bar {\mathbb{U}}. With m different boundary points zs, (s = 1,2,...,m), we consider αm ∈ eiβ𝒜−j−λf(𝕌), here 𝒜−j−λ is the generalized Alexander integral operator and 𝕌 is the open unit disc. Applying 𝒜−j−λ, a subclass Bn(αm,β,ρ; j, λ) of Tn is defined with fractional integral for functions f. The object of present paper is to consider some interesting properties of f to be in Bn(αm,β,ρ; j, λ).

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