English

Fatou's associates

Dynamical Systems 2021-03-30 v4 Complex Variables

Abstract

Suppose that ff is a transcendental entire function, VCV \subsetneq \mathbb{C} is a simply connected domain, and UU is a connected component of f1(V)f^{-1}(V). Using Riemann maps, we associate the map f ⁣:UVf \colon U \to V to an inner function g ⁣:DDg \colon \mathbb{D} \to \mathbb{D}. It is straightforward to see that gg is either a finite Blaschke product, or, with an appropriate normalisation, can be taken to be an infinite Blaschke product. We show that when the singular values of ff in VV lie away from the boundary, there is a strong relationship between singularities of gg and accesses to infinity in UU. In the case where UU is a forward-invariant Fatou component of ff, this leads to a very significant generalisation of earlier results on the number of singularities of the map gg. If UU is a forward-invariant Fatou component of ff there are currently very few examples where the relationship between the pair (f,U)(f, U) and the function gg have been calculated. We study this relationship for several well-known families of transcendental entire functions. It is also natural to ask which finite Blaschke products can arise in this way, and we show the following: For every finite Blaschke product gg whose Julia set coincides with the unit circle, there exists a transcendental entire function ff with an invariant Fatou component such that gg is associated to ff in the above sense. Furthermore, there exists a single transcendental entire function ff with the property that any finite Blaschke product can be arbitrarily closely approximated by an inner function associated to the restriction of ff to a wandering domain.

Keywords

Cite

@article{arxiv.2002.03320,
  title  = {Fatou's associates},
  author = {Vasiliki Evdoridou and Lasse Rempe and David J. Sixsmith},
  journal= {arXiv preprint arXiv:2002.03320},
  year   = {2021}
}

Comments

32 pages, 6 figures. V4: Author accepted manuscript. To appear in Arnold Mathematical Journal (special volume dedicated to Prof. Mikhail Lyubich). A number of figures added from V1; general revision throughout; minor corrections of the proofs in Sections 8 and 9

R2 v1 2026-06-23T13:35:36.204Z