The theorems of Schottky and Landau for analytic functions omitting the n-th roots of unity
arXiv:1405.0383
Abstract
We prove sharp Landau- and Schottky-type theorems for analytic functions which omit the $n$-th roots of unity. The proofs are based on a sharp lower bound for the Poincaré metric of the complex plane punctured at the roots of unity.