Hyperbolic distance and membership of conformal maps in the Hardy space

Abstract

Let be a conformal map of the unit disk D onto an unbounded domain and, for α >0, let Fα =\ z ∈ D:| ( z ) | = α \. If Hp( D ) denotes the classical Hardy space and dD ( 0,Fα ) denotes the hyperbolic distance between 0 and Fα in D, we prove that belongs to Hp( D ) if and only if \[∫0 + ∞ α p - 1e - dD( 0,Fα )dα < + ∞ .\] This result answers a question posed by P. Poggi-Corradini.