Remarks on one-component inner functions

Abstract

A one-component inner function is an inner function whose level set ()=\z∈ D:|(z)|<\ is connected for some ∈ (0,1). We give a sufficient condition for a Blaschke product with zeros in a Stolz domain to be a one-component inner function. Moreover, a sufficient condition is obtained in the case of atomic singular inner functions. We study also derivatives of one-component inner functions in the Hardy and Bergman spaces. For instance, it is shown that, for 0<p<∞, the derivative of a one-component inner function is a member of the Hardy space Hp if and only if '' belongs to the Bergman space Ap-1p, or equivalently '∈ Ap-12p.