A Note On Transcendental Analytic Functions With Rational Coefficients Mapping Q Into Itself
Abstract
In this note, the main focus is on a question about transcendental entire functions mapping Q into Q (which is related to a Mahler's problem). In particular, we prove that, for any t>0, there is no a transcendental entire function f∈Q[[z]] such that f(Q)⊂eqQ and whose denominator of f(p/q) is O(qt), for all rational numbers p/q, with q sufficiently large.
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