Wandering dynamics of transcendental functions

Abstract

We show that any uniformly escaping and wandering dynamics of a holomorphic function on a compact subset of the plane can be realised by a transcendental meromorphic function on C. More precisely, let be a holomorphic function on an open subset of the complex plane, and suppose that K is a compact set such that and all its iterates n are defined on K, and n(K)∞ as n∞. We prove that there exist a transcendental meromorphic function fC and a compact set K such that the dynamics of f on the orbit of K is conjugate, via a smooth change of coordinate close to the identity, to that of on the orbit of K. If K does not separate the plane, the function f may be chosen to be entire. If all iterates of are univalent on K, we can take K=K. We also prove a similar theorem for oscillating dynamics. Finally, we use our results to answer a number of questions of Benini et al. concerning wandering domains of entire functions.