映射到不同域上的Sakaguchi类函数子类的系数界估计

IF 0.3 Q4 MATHEMATICS Concrete Operators Pub Date : 2023-01-01 DOI:10.1515/conop-2022-0140

B. Aarthy, B. Keerthi

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引用次数: 0

摘要

摘要在花瓣形区域的开放单元盘D {\mathbb{D}}上，我们定义了解析函数的一个新的子类:积分函数(t， δ) {\mathcal{ {\mathcal R} }}\left (t, \delta)。得到了这类函数的系数{a2a＿2}、{a3a＿3}和{a4a＿4的}界{。我们还得到了定义类中函数的Fekete-Szegö不等式的界和Toeplitz行列式t2 (2) }{}{}{{\mathcal{T}}} ＿2 {}\left(2)和t3 (1) {{\mathcal{T}}} ＿3 {}\left(1)的界。

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Estimation of coefficient bounds for a subclass of Sakaguchi kind functions mapped onto various domains

Abstract In this article, we define a new subclass of analytic functions ℛ ( t , δ ) {\mathcal{ {\mathcal R} }}\left(t,\delta ) in the open unit disk D {\mathbb{D}} associated with the petal-shaped domain. The bounds of the coefficients a 2 {a}_{2} , a 3 {a}_{3} , and a 4 {a}_{4} for the functions in the new class are obtained. We also acquire the bound of the Fekete-Szegö inequality and the bound of the Toeplitz determinants T 2 ( 2 ) {{\mathcal{T}}}_{2}\left(2) and T 3 ( 1 ) {{\mathcal{T}}}_{3}\left(1) for the functions in the defined class.

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