Bohr radius for some classes of Harmonic mappings

Abstract

We introduce a general class of sense-preserving harmonic mappings defined as follows: equation* S0h+g(M):= \f=h+g: Σm=2∞(γm|am|+δm|bm|)≤ M, \; M>0 \, equation* where h(z)=z+Σm=2∞amzm, g(z)=Σm=2∞bm zm are analytic functions in D:=\z∈C: |z|≤1 \ and equation* γm,\; δm ≥ α2:= \γ2, δ2\>0, equation* for all m≥2. We obtain Growth Theorem, Covering Theorem and derive the Bohr radius for the class S0h+g(M). As an application of our results, we obtain the Bohr radius for many classes of harmonic univalent functions and some classes of univalent functions.