On the univalence of polyanalytic functions

Abstract

A continuous complex-valued function F in a domain D⊂eqC is Poly-analytic of order α if it satisfies ∂αzF=0. One can show that F has the form F(z)=Σ0n-1zkAk(z), where each Ak is an analytic function. In this paper, we prove the existence of a Landau constant for Poly-analytic functions and the special Bi-analytic case. We also establish the Bohr's inequality for poly-analytic and bi-analytic functions which map U into U. In addition, we give an estimate for the arclength over the class of poly-analytic mappings and consider the problem of minimizing moments of order p.