Chebyshev polynomials on generalized Julia sets
Abstract
Let (fn)n=1∞ be a sequence of nonlinear polynomials satisfying some mild conditions. Furthermore, let Fm(z)=(fm fm-1… f1)(z) and m be the leading coefficient for Fm. It is shown that on the Julia set J(fn), the Chebyshev polynomial of the degree degFm is of the form Fm(z)/m-τm for all m∈N where τm∈C. This generalizes the result obtained for autonomous Julia sets.
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