Iteration of some topologically hyperbolic maps in the family λ+z+ z
Abstract
Iteration of the function fλ(z)=λ + z+ z, z ∈ C is investigated in this article. It is proved that for every λ, the Fatou set of fλ has a completely invariant Baker domain B; we call it the primary Fatou component. The rest of the results deals with fλ when it is topologically hyperbolic. For all real λ or λ such that λ=π k +i λ2 for some integer k and 0 < λ2<1, the only other Fatou component is shown to be another completely invariant Baker domain. It is proved that if |2+λ2|<1, then the Fatou set is the union of B and infinitely many invariant attracting domains. Every such domain U has exactly one invariant access to infinity and is unbounded in a special way; \(z): z∈ U\ is unbounded whereas \(z): z∈ U\ is bounded. If (λ)> 2+ -11 then it is found that the primary Fatou component is the only Fatou component and the Julia set is disconnected. For every natural number k, the Fatou set of fλ for λ=kπ+iπ2 is shown to contain k wandering domains with distinct grand orbits. These wandering domains are found to be escaping. The Fatou set is the union of B, these wandering domains and their pre-images.
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