On a class of pluriharmonic mappings in the unit polydisk

Abstract

In this paper, we introduce and study the class WHn0(α) of normalized pluriharmonic mappings, characterized by a suitable bound on their second-order partial derivatives. We establish a one-to-one correspondence between this pluriharmonic class and an associated class of holomorphic functions, thereby extending a result of Ghosh and Vasudevarao Ghosh-Allu-2019 to the setting of several complex variables. Furthermore, we obtain sharp coefficient bounds, growth estimates and a convex combination theorem for functions in WHn0(α). Finally, we introduce sections (partial sums) of pluriharmonic mappings and investigate their properties for functions belonging to WHn0(α).

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