Extension of Lohwater-Pommerenke's Theorem for strongly-normal Maps

Abstract

We introduce strong normality for holomorphic curves and logharmonic mappings, extending classical normality concepts. We establish an extension of the rescaling characterization due to Lohwater and Pommerenke for not strongly-normal maps. In addition, we also study the Bloch mappings, little-Bloch mappings and prove Zalcman-Pang type rescaling results for them. The framework is further extended to strongly φ-normal mappings, yielding a unified treatment across these settings.