On Stable Univalence and Coefficient Estimates for a Class of Pluriharmonic Mappings in Convex Reinhardt Domains

Abstract

In this paper, we investigate the geometric properties of complex-valued pluriharmonic mappings defined over convex Reinhardt domains in Cn. We first establish a multidimensional analogue of the Noshiro-Warschawski Theorem, providing sufficient conditions for the univalence of pluriharmonic mappings based on the real part of their partial derivatives. Furthermore, we introduce and study the class BHn0(M) of normalized pluriharmonic mappings, characterized by a specific bound on the sum of their second-order partial derivatives. We prove a one-to-one correspondence between this pluriharmonic class and a corresponding class of holomorphic functions, extending known results from the planar harmonic case to higher dimensions. Specifically, we show that a pluriharmonic mapping f=h+g is stable pluriharmonic univalent if and only if its holomorphic counterpart F=h+g is stable holomorphic univalent on the unit polydisk P(0;1). Finally, we provide sharp coefficient estimates and sufficient conditions for functions to belong to the class BHn0(M). Our results generalize several classical theorems in the theory of univalent harmonic functions to the setting of several complex variables.