Inner functions associated to lifts of transcendental entire functions

Abstract

Let f be a transcendental entire function, V be a simply connected Fatou component of f, and U be a Fatou component with f(U)⊂ V. There is a natural way to associate f|U to an inner function, namely a function gf:=ψ-1 fφ, where φ:D U and ψ:D V are Riemann maps. Inner functions have been used as a tool in the study of the iterates of transcendental entire, and more recently meromorphic, functions. However, there are only a few examples where associated inner functions have been calculated explicitly, with the case where f has infinite degree in U being the least well understood and more complicated. In this paper, we introduce a general method for calculating associated inner functions to a wide class of entire functions arising as `lifts'. In particular, if f is a lift of a transcendental entire function h, we show that an inner function associated to f|U can be obtained by relating it to an inner function associated to h|G, where G is the Fatou component that lifts to U. This result significantly generalises the main part of a theorem by Evdoridou, Rempe and Sixmith, and can be applied to several functions that have been studied so far. In both finite- and infinite-degree settings, the results hold for forward-invariant Fatou components as well as for wandering domains.