Zero distribution of finite order Bank--Laine functions
Abstract
It is known that a Bank-Laine function E is a product of two normalized solutions of the second order differential equation f"+Af=0 (), where A=A(z) is an entire function. By using Bergweiler and Eremenko's method of constructing transcendental entire function A(z) by gluing certain meromorphic functions with infinitely many times, we show that, for each λ∈[1,∞) and each δ∈[0,1], there exists a Bank--Laine function E such that E=f1f2 with f1 and f2 being two entire functions such that λ(f1)=δλ and λ(f2)=λ, respectively. We actually provide a simpler construction of the special Bank--Laine functions given by Bergweiler and Eremenko.
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