Bohr-Rogosinski and improved Bohr type inequalities for certain fully starlike harmonic mappings

Abstract

The classical Bohr inequality states that if f is an analytic function with the power series representation f(z)=Σn=0∞anzn in the unit disk D:=\z∈C : |z|<1\ such that |f(z)|≤ 1 for all z∈D , then equation* Σn=0∞|an|rn≤ 1\;\; for\;\; |z|=r≤13 equation* and the constant 1/3 cannot be improved. The constant r0=1/3 is known as Bohr radius and the inequality Σn=0∞|an|rn≤ 1 is known as Bohr inequality. Let H be the class of complex-valued harmonic mappings f=h+g defined in the unit disk D , 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\. Let P0H(M) :=\f=h+g ∈ H0: (zh(z))> -M+|zg(z)|,\; z ∈ D,\; M>0\ . Functions in the class P0H(M) are called fully starlike univalent functions for 0<M<1/ 4 . In this paper, we obtain the sharp Bohr-Rogosinski type inequality and improved Bohr inequality and the corresponding Bohr radius for the class PH0(M) .