A note on composition operators on model spaces

Abstract

Motivated by the study of composition operators on model spaces launched by Mashreghi and Shabankha we consider the following problem: for a given inner function φ∈Aut( D), find a non-constant inner function satisfying the functional equation φ=τ, where τ is a unimodular constant. We prove that this problem has a solution if and only if φ is of positive hyperbolic step. More precisely, if this condition holds, we show that there is an infinite Blaschke product B satisfying the equation for τ=1. If in addition, φ is parabolic, we prove that the problem has a solution for any unimodular τ. Finally, we show that if φ is of zero hyperbolic step, then no non-constant Bloch function f and no unimodular constant τ satisfy fφ=τ f.