Local Connectivity of Polynomial Julia sets at Bounded Type Siegel Boundaries


Abstract in English

Consider a polynomial $f$ of degree $d geq 2$ that has a Siegel disk $Delta_f$ with a rotation number of bounded type. We prove that there does not exist a hedgehog containing $Delta_f$. Moreover, if the Julia set $J_f$ of $f$ is connected, then it is locally connected at the Siegel boundary $partial Delta_f$.

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