Uniformly bounded components of normality

Abstract

Suppose that f(z) is a transcendental entire function and that the Fatou set F(f)≠. Set B1(f):=Uz∈ U(|z|+3)∈fw∈ U(|w|+3) and B2(f):=Uz∈ U(|z|+30)∈fw∈ U(|w|+3), where the supremum U is taken over all components of F(f). If B1(f)<∞ or B2(f)<∞, then we say F(f) is strongly uniformly bounded or uniformly bounded respectively. In this article, we will show that, under some conditions, F(f) is (strongly) uniformly bounded.

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