Abstract
Given a prime number $p$ let $\mathbb{C}\_p$ be the topological completion of the algebraic closure of the field of $p$-adic numbers. Let $O(T)$ be the Galois orbit of a transcendental element $T$ of $\mathbb{C}\_p$ with respect to the absolute Galois group. Our aim is to study the class of Galois equivariant functions defined on $O(T)$ with values in $\mathbb{C}\_p$. We show that each function from this class is continuous and we characterize the class of Lipschitz functions, respectively the class of differentiable functions, with respect to a new orthonormal basis. Then we discuss some aspects related to analytic continuation for the functions of this class.
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