On the Algebraic Independence of E- and G-Functions, I: A p-adic Criterion

Abstract

Let K be a finite extension of Qp, and let f1(z),…, fm(z) ∈ K[[z]] such that, for every 1 ≤ i ≤ m, fi(z) is a solution of a differential operator Li ∈ Ep[d/dz], where Ep is the field of analytic elements. Suppose that K is totally ramified over Qp, and that for every 1 ≤ i ≤ m, the operator Li has a strong Frobenius structure and satisfies the maximal order multiplicity (MOM) condition at zero. Then, we show that f1(z),…, fm(z) are algebraically dependent over Ep if and only if there exist integers a1,…, am, not all zero, such that f1(z)a1 ·s fm(z)am∈ Ep. The main consequence of this result is that it provides a tool to study the algebraic independence of a broad class of G-functions and certain E-functions over the field of analytic elements.

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