Two results on quasimeromorphic mappings (Q2739207)

The author proves that for a \(K\)-quasi meromorphic mapping \(f(z)\) of finite order in \(\mathbb{C}\) there exists at least a Borel direction and a sequence of filling disks and that a family \({\mathfrak L}\) of these mappings in a domain \(D\) is normal if for five different complex numbers \(a_j\) and for any \(f(z)\in {\mathfrak L}\), \(f(z)-a_j\) has no simple zeros in \(D\).