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On supports of dynamical laminations and biaccessible points in polynomial Julia sets

Tom 87 / 2001

Stanislav K. Smirnov Colloquium Mathematicum 87 (2001), 287-295 MSC: Primary 37F20; Secondary 30C85, 30D05. DOI: 10.4064/cm87-2-11

Streszczenie

We use Beurling estimates and Zdunik's theorem to prove that the support of a lamination of the circle corresponding to a connected polynomial Julia set has zero length, unless $f$ is conjugate to a Chebyshev polynomial. Equivalently, except for the Chebyshev case, the biaccessible points in the connected polynomial Julia set have zero harmonic measure.

Autorzy

  • Stanislav K. SmirnovDepartment of Mathematics
    Yale University
    New Haven, CT 06520, U.S.A.
    Institute for Advanced Study
    Princeton, NJ 08540, U.S.A. Current address:
    Dep. of Mathematics
    KTH
    S-10044 Stockholm, Sweden
    e-mail

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