Annular itineraries for entire functions

Abstract

In order to analyse the way in which the size of the iterates (fn(z)) of a transcendental entire function f can behave, we introduce the concept of the annular itinerary of a point z. This is the sequence of non-negative integers s0s1... defined by \[ fn(z)∈ Asn(R),\;\;forn 0, \] where A0(R)=\z:|z|<R\ and \[ An(R)=\z:Mn-1(R) |z|<Mn(R)\,\;\;n 1. \] Here M(r) is the maximum modulus of f and R>0 is so large that M(r)>r, for r R. We consider the different types of annular itineraries that can occur for any transcendental entire function f and show that it is always possible to find points with various types of prescribed annular itineraries. The proofs use two new annuli covering results that are of wider interest.