Bohr phenomenon for certain close-to-convex analytic functions

Abstract

We say that a class B of analytic functions f of the form f(z)=Σn=0∞ anzn in the unit disk D:=\z∈ C: |z|<1\ satisfies a Bohr phenomenon if for the largest radius Rf<1, the following inequality Σn=1∞ |anzn| ≤ d(f(0),∂ f(D) ) holds for |z|=r≤ Rf and for all functions f ∈ B. The largest radius Rf is called Bohr radius for the class B. In this article, we obtain Bohr radius for certain subclasses of close-to-convex analytic functions. We establish the Bohr phenomenon for certain analytic classes Sc*(φ),\,Cc(φ),\, Cs*(φ),\, Ks(φ). Using Bohr phenomenon for subordination classes [Lemma 1]bhowmik-2018, we obtain some radius Rf such that Bohr phenomenon for these classes holds for |z|=r≤ Rf. Generally, in this case Rf need not be sharp, but we show that under some additional conditions on φ, the radius Rf becomes sharp bound. As a consequence of these results, we obtain several interesting corollaries on Bohr phenomenon for the aforesaid classes.