Zero distribution of finite order Bank-Laine functions (Q6544547)

In this article, by using Bergweiler and Eremenko's method of constructing transcendental entire function, the author provides a complete construction of the Bank-Laine functions. He shows that, for each \(\lambda \in [1, \infty)\) and each \(\delta \in [0, 1]\), there exists a Bank-Laine function \(E\) such that \(E = f_1 f_2 \) with \(f_1\) and \(f_2\) being two entire functions such that \(\lambda (f_1) = \delta \lambda\) and \(\lambda (f_2) = \lambda,\) respectively.\N\NIn my opinion, this paper is well worth a good read. It summarized the latest results in the field and introduced new idea for the research of the growth of solutions of complex differential equations. It is of great significance for future research.