Outer functions and uniform integrability

Abstract

We show that, if f is an outer function and a∈[0,1), then the set of functions \ |(f)*|: :D holomorphic, |(0)| a\ is uniformly integrable on the unit circle. As an application, we derive a simple proof of the fact that, if f is outer and φ:D is holomorphic, then fφ is outer.