Complementary components to the cubic Principal Hyperbolic Domain

Abstract

We study the closure of the cubic Principal Hyperbolic Domain and its intersection Pλ with the slice Fλ of the space of all cubic polynomials with fixed point 0 defined by the multiplier λ at 0. We show that any bounded domain W of Fλλ consists of J-stable polynomials f with connected Julia sets J(f) and is either of Siegel capture type (then f∈ W has an invariant Siegel domain U around 0 and another Fatou domain V such that f|V is two-to-one and fk(V)=U for some k>0) or of queer type (then at least one critical point of f∈ W belongs to J(f), the set J(f) has positive Lebesgue measure, and carries an invariant line field).