Dynamics of generalised exponential maps

Abstract

Since 1984, many authors have studied the dynamics of maps of the form Ea(z) = ez - a, with a > 1. It is now well-known that the Julia set of such a map has an intricate topological structure known as a Cantor bouquet, and much is known about the dynamical properties of these functions. In recent papers some of these ideas have been generalised to a class of quasiregular maps in R3, which, in a precise sense, is analogous to the class of maps of the form Ea. Our goal in this paper is to make similar generalisations in R2. In particular, we show that there is a large class of continuous maps, which, in general, are not even quasiregular, but are closely analogous to the map Ea, and have very similar dynamical properties. In some sense this shows that many of the interesting dynamical properties of the map Ea arise from its elementary function theoretic structure, rather than as a result of analyticity.