Non-escaping endpoints do not explode

Abstract

The family of exponential maps fa(z)= ez+a is of fundamental importance in the study of transcendental dynamics. Here we consider the topological structure of certain subsets of the Julia set J(fa). When a∈ (-∞,-1), and more generally when a belongs to the Fatou set of fa, it is known that J(fa) can be written as a union of "hairs" and "endpoints" of these hairs. In 1990, Mayer proved for a∈ (-∞,-1) that, while the set of endpoints is totally separated, its union with infinity is a connected set. Recently, Alhabib and the second author extended this result to the case where a ∈ F(fa), and showed that it holds even for the smaller set of all escaping endpoints. We show that, in contrast, the set of non-escaping endpoints together with infinity is totally separated. It turns out that this property is closely related to a topological structure known as a `spider's web'; in particular we give a new topological characterisation of spiders' webs that may be of independent interest. We also show how our results can be applied to Fatou's function, z z + 1 + e-z.