A note on composition operators on model spaces
Complex Variables
2023-05-15 v1 Functional Analysis
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 , find a non-constant inner function satisfying the functional equation , where is a unimodular constant. We prove that this problem has a solution if and only if is of positive hyperbolic step. More precisely, if this condition holds, we show that there is an infinite Blaschke product satisfying the equation for . If in addition, is parabolic, we prove that the problem has a solution for unimodular . Finally, we show that if is of zero hyperbolic step, then no non-constant Bloch function and no unimodular constant satisfy .
Cite
@article{arxiv.2305.07526,
title = {A note on composition operators on model spaces},
author = {Isabelle Chalendar and Pavel Gumenyuk and John E. McCarthy},
journal= {arXiv preprint arXiv:2305.07526},
year = {2023}
}