Algebraic periodic points of transcendental entire functions
Abstract
We prove the existence of transcendental entire functions f having a property studied by Mahler, namely that f(Q)⊂eq Q and f-1(Q)⊂eq Q, and in addition having a prescribed number of k-periodic algebraic orbits, for all k≥ 1. Under a suitable topology, such functions are shown to be dense in the set of all entire transcendental functions.
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