Convergence of linear combinations of iterates of an inner function

Abstract

Let f be an inner function with f(0)=0 which is not a rotation and let fn be its n-th iterate. Let {an} be a sequence of complex numbers. We prove that the series ∑anfn(ξ) converges at almost every point ξ of the unit circle if and only if ∑|an|2<∞. The main step in the proof is to show that under this assumption, the function F=∑anfn has bounded mean oscillation. We also prove that F is bounded on the unit disc if and only if ∑|an|<∞. Finally we describe the sequences of coefficients {an} such that F belongs to other classical function spaces, as the disc algebra and the Dirichlet class. © 2022 Elsevier Masson SAS