Boundary of the central hyperbolic component I: dynamical properties
Abstract
We study the dynamics of polynomial maps on the boundary of the central hyperbolic component Hd. We prove the local connectivity of Julia sets and a rigidity theorem for maps on the regular part of ∂ Hd. Our proof is based on the construction of Fatou trees and employs the puzzle technique as a key methodological framework. These results are applicable to a larger class of maps for which the maximal Fatou trees equal the filled Julia sets.
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