Cutpoints of invariant subcontinua of polynomial Julia sets
Abstract
We prove fixed point results for branched covering maps f of the plane. For complex polynomials P with Julia set JP these imply that periodic cutpoints of some invariant subcontinua of JP are also cutpoints of JP. We deduce that, under certain assumptions on invariant subcontinua Q of JP, every Riemann ray to Q landing at a periodic repelling/parabolic point x∈ Q is isotopic to a Riemann ray to JP relative to Q.
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