On the Exceptional Sets of p-adic Transcendental Analytic Functions

Abstract

In this paper, we study the exceptional sets Sf of p-adic transcendental analytic functions f with rational and algebraic coefficients. We establish a necessary condition for a subset S ⊂eq Q B(0, ) to be the exceptional set of a p-adic transcendental analytic function with rational coefficients, demonstrating that, in general, the answer to Mahler's Problem C over Cp is negative. However, we prove that if S is closed under algebraic conjugation and contains 0, there exist uncountably many transcendental analytic functions f ∈ Q[[z]] such that Sf = S. Furthermore, if ≥ 1, f can be taken in Z[[z]]. Additionally, we demonstrate that any S ⊂eq Q B(0, ) containing 0 can be the exceptional set of uncountably many transcendental analytic functions f ∈ Q[[z]].

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