A normality criterion involving rotations and dilations in the argument

Abstract

We show that a family \(\mathcal{F}\) of analytic functions in the unit disk \({\mathbb{D}}\) all of whose zeros have multiplicity at least k and which satisfy a condition of the form $$f^n(z)f^{(k)}(xz)\ne1$$ for all \(z\in{\mathbb{D}}\) and \(f\in\mathcal{F}\) (where n≥3, k≥1 and 0<|x|≤1) is normal at the origin. The proof relies on a modification of Nevanlinna theory in combination with the Zalcman–Pang rescaling method. Furthermore we prove the corresponding Picard-type theorem for entire functions and some generalizations.