Cubic Polynomial Maps with Periodic Critical Orbit, Part II: Escape Regions

Abstract

The parameter space Sp for monic centered cubic polynomial maps with a marked critical point of period p is a smooth affine algebraic curve whose genus increases rapidly with p. Each Sp consists of a compact connectedness locus together with finitely many escape regions, each of which is biholomorphic to a punctured disk and is characterized by an essentially unique Puiseux series. This note will describe the topology of Sp, and of its smooth compactification, in terms of these escape regions. It concludes with a discussion of the real sub-locus of Sp.