On polyharmonic univalent mappings

Abstract

In this paper, we introduce a class of complex-valued polyharmonic mappings, denoted by HSp(λ), and its subclass HSp0(λ), where λ∈ [0,1] is a constant. These classes are natural generalizations of a class of mappings studied by Goodman in 1950's. We generalize the main results of Avci and Zotkiewicz from 1990's to the classes HSp(λ) and HSp0(λ), showing that the mappings in HSp(λ) are univalent and sense preserving. We also prove that the mappings in HSp0(λ) are starlike with respect to the origin, and characterize the extremal points of the above classes.