Bohr radius for certain classes of starlike and convex univalent functions

Abstract

We say that a class F consisting of analytic functions f(z)=Σn=0∞ anzn in the unit disk D:=\z∈ C: |z|<1\ satisfies a Bohr phenomenon if there exists rf ∈ (0,1) such that Σn=1∞ |anzn|≤ d(f(0),∂ f(D)) for every function f ∈ F and |z|=r≤ rf, where d is the Euclidean distance. The largest radius rf is the Bohr radius for the class F. In this paper, we establish the Bohr phenomenon for the classes consisting of Ma-Minda type starlike functions and Ma-Minda type convex functions as well as for the class of starlike functions with respect to a boundary point.