On symmetries of iterates of rational functions

Abstract

Let A be a rational function of degree n≥ 2. Let us denote by G(A) the group of M\"obius transformations σ such that A σ=σ A for some M\"obius transformations σ, and by (A) and Aut(A) the subgroups of G(A) consisting of σ such that A σ= A and A σ= σ A, correspondingly. In this paper, we study sequences of the above groups arising from iterating A. In particular, we show that if A is not conjugate to z n, then the orders of the groups G(A k), k≥ 2, are finite and uniformly bounded in terms of n only. We also prove a number of results about the groups ∞(A)=k=1∞ (A k) and Aut∞(A)=k=1∞ Aut(A k), which are especially interesting from the dynamical perspective.