Shrinking targets and recurrent behaviour for forward compositions of inner functions

TL;DR

This paper investigates the recurrent behavior of forward compositions of inner functions, extending classical results and dichotomies from iteration to non-autonomous sequences, with sharp conditions and illustrative examples.

Contribution

It generalizes classical recurrence and dichotomy results for inner functions to non-autonomous compositions, establishing sharp contraction conditions and providing new examples.

Findings

Established sharp conditions for recurrence in forward compositions.

Extended the dichotomy of inner function behavior to non-autonomous sequences.

Provided examples demonstrating the optimality of contraction conditions.

Abstract

We prove sharp results about recurrent behaviour of orbits of forward compositions of inner functions, inspired by fundamental results about iterates of inner functions, and give examples to illustrate behaviours that cannot occur in the simpler case of iteration. A result of Fern\'andez, Meli\'an and Pestana gives a precise version of the classical Poincar\'e recurrence theorem for iterates of the boundary extension of an inner function that fixes~0. We generalise this to forward composition sequences $F_n=f_n\circ \dots\circ f_1,$ $n\in \mathbb{N},$ where $f_n$ are inner functions that fix~0, giving conditions on the contraction of $(F_n)$ so that the radial boundary extension $F_n$ hits any shrinking target of arcs $(I_n)$ of a given size. Next, Aaronson, and also Doering and Ma\~n\'e, gave a remarkable dichotomy for iterates of any inner function, showing that the behaviour of the boundary extension is of two entirely different types, depending on the size of the sequence $(|f^n(0)|)$. In earlier work, we showed that one part of this dichotomy holds in the non-autonomous setting of forward compositions. It turns out that this dichotomy is closely related to the result of Fern\'andez, Meli\'an and Pestana, and here we show that a version of the second part of the dichotomy holds in the non-autonomous setting provided we impose a condition on the contraction of $(F_n)$ in relation to the size of the sequence $(|F_n(0)|)$. The techniques we use include a strong version of the second Borel--Cantelli lemma and strong mixing results of Pommerenke for contracting sequences of inner functions. We give examples to show that the contraction conditions that we need to impose in the non-autonomous setting are best possible.