Improved Bohr inequalities for certain class of harmonic univalent functions

Abstract

Let H be the class of complex-valued harmonic mappings f=h+g defined in the unit disk D : =\z∈C : |z|<1\ , where h and g are analytic functions in D with the normalization h(0)=0=h(0)-1 and g(0)=0 . Let H0=\f=h+g∈H : g(0)=0\. Ghosh and Vasudevrao Ghosh-Vasudevarao-BAMS-2020 have studied the following interesting harmonic univalent class P0H(M) which is defined by P0H(M) :=\f=h+g ∈ H0: Re (zh(z))> -M+|zg(z)|,\; z ∈ D\; and\;\; M>0\. In this paper, we obtain the sharp Bohr-Rogosinski inequality, improved Bohr inequality, refined Bohr inequality and Bohr-type inequality for the class PH0(M) .