On a powered Bohr inequality

Abstract

The object of this paper is to study the powered Bohr radius p, p ∈ (1,2), of analytic functions f(z)=Σk=0∞ akzk and such that |f(z)|<1 defined on the unit disk |z|<1. More precisely, if Mpf (r)=Σk=0∞ |ak|p rk, then we show that Mpf (r)≤ 1 for r ≤ rp where r is the powered Bohr radius for conformal automorphisms of the unit disk. This answers the open problem posed by Djakov and Ramanujan in 2000. A couple of other consequences of our approach is also stated, including an asymptotically sharp form of one of the results of Djakov and Ramanujan. In addition, we consider a similar problem for sense-preserving harmonic mappings in |z|<1. Finally, we conclude by stating the Bohr radius for the class of Bieberbach-Eilenberg functions.