Convex hulls of polynomial Julia sets
Abstract
We prove P. Alexandersson's conjecture that for every complex polynomial p of degree d ≥ 2 the convex hull Hp of the Julia set Jp of p satisfies p-1(Hp) ⊂ Hp. We further prove that the equality p-1(Hp) = Hp is achieved only if p is affinely conjugated to the Chebyshev polynomial Td of degree d, to -Td or a monomial c zd with |c|=1.
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