Geometric subfamily of functions convex in some direction and Blaschke products

Liulan Li, Saminthan Ponnusamy
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引用次数: 0

Abstract

Consider the family of locally univalent analytic functions $h$ in the unit disk $|z|<1$ with the normalization $h(0)=0$, $h'(0)=1$ and satisfying the condition $${\real} \left( \frac{z h''(z)}{\alpha h'(z)}\right) <\frac{1}{2} ~\mbox{ for $z\in \ID$,} $$ where $0<\alpha\leq1$. The aim of this article is to show that this family has several elegant properties such as involving Blaschke products, Schwarzian derivative and univalent harmonic mappings.
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沿某一方向凸的函数几何亚族和布拉什克积
考虑单位盘$|z|<1$中局部不等价解析函数$h$的族,其归一化为$h(0)=0$, $h'(0)=1$,并满足条件$${\real}。\left( \frac{z h''(z)}{\alpha h'(z)}\right) <\frac{1}{2}~\mbox{ for $z\in \ID$,} $$ 其中 $0<\alpha\leq1$.本文的目的是要证明这个族有几个优雅的性质,如涉及布拉斯克乘积、施瓦茨导数和单值谐波映射。
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