On the Growth of Transcendental Entire Functions with Unbounded Fatou Components

On the Growth of Transcendental Entire Functions with Unbounded Fatou Components

Suppose that f( z ) is a transcendental entire function and that F(f) contains unbounded Fatou components. In this article, we obtained some links between the lowor bounds of the lower order of f and the angle of an angular sector which is completely contained in an unbounded Fatou component of F(f)...

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Veröffentlicht in:Dong Hua da xue xue bao. Zi ran ke xue ban. 2006-04, Vol.23 (2), p.80-82
1. Verfasser: 伍家凤 徐光伟 王小灵
Format: Artikel
Sprache:eng
Schlagworte:
低次序
必需条件
角扇区
超越完整函数
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Zusammenfassung:Suppose that f( z ) is a transcendental entire function and that F(f) contains unbounded Fatou components. In this article, we obtained some links between the lowor bounds of the lower order of f and the angle of an angular sector which is completely contained in an unbounded Fatou component of F(f). Then, we investigate the bounded components for the Julia set J(f) of a transcendental entire function f(z ) and obtain a sufficient and necessary condition.
ISSN:1672-5220