Primitive prime divisors in the critical orbit of zd+c
Abstract
We prove the finiteness of the Zsigmondy set associated to the critical orbit of f(z) = zd+c for rational values of c by finding an effective bound on the size of the set. For non-recurrent critical orbits, the Zsigmondy set is explicitly computed by utilizing effective dynamical height bounds. In the general case, we use Thue-style Diophantine approximation methods to bound the size of the Zsigmondy set when d >2, and complex-analytic methods when d=2.
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