Alg\'ebricit\'e modulo p, s\'eries hyperg\'eom\'etriques et structures de Frobenius forte

Abstract

This work is devoted to study of algebraicty modulo p of Siegel's G-functions. Our goal is to emphasize the relevance of the notion of strong Frobenius structure, clasically studied in the theory of the p-adic diffenrential equations, for the study of a Adamczewski-Delaygue's conjecture concerning of the degree of algebraicity modulo p of G-functions. For this, we first make a Christol's result explicit by showing that if f is a G-function that is solution of a differential operator L in Q(z)[d/dz] of order n endowed of a strong Frobenius structure of period h for the prime number p and that f(z) belongs to Z(p)[[z]], then the reduction of f modulo p is algebraic over Fp(z) and its algebraicity degree is bounded by pn2h. By generalizing an approach introduced by Salinier, we show that if L is a Fuchsian operator with coefficients in Q(z), whose monodromy group is rigid and whose exponents are rational numbers, then L has for almost every prime number p a strong Frobenius structure of period h, where h is explicitly bounded and does not depend on p. A slightly different version of this result has been recently demonstrated by Crew following a different approach based on the p -adic cohomology. We use these two results to solve the mentioned conjecture in the case of generalized hypergeometric series.