Maximal Unipotent Monodromy, congruences "\`a la Lucas" and Algebraic independence

Abstract

Let f(z) be in 1+zQ[[z]] and S be an infinite set of prime numbers such that, for all p∈S, we can reduce f(z) modulo p. We let f(z) p denote the reduction of f(z) modulo p. Generally, when f(z) is D-finite, f(z) p is algebraic over Fp(z). It turns out that if f(z) is a solution of a polynomial of the form X-Ap(z)Xpl, we can use this type of equations to obtain results of transcendence and algebraic independence over Q(z). In the present paper, we look for conditions on the differential operators annihilating f(z) to guarantee the existence of these particular equations. Suppose that f(z) is solution of a differential operator H∈Q(z)[d/dz] having a strong Frobenius structure for all p∈S and we also suppose that f(z) annihilates a Fuchsian differential operator D∈Q(z)[d/dz] such that zero is a regular singular point of D and the exponents of D at zero are equal to zero. Our main result states that, for almost every prime p∈S, f(z) p is solution of a polynomial of the form X-Ap(z)Xpl, where Ap(z) is a rational function with coefficients in Fp of height less than or equal to Cp2l with C a positive constant that does not depend on p. We also study the algebraic independence of these power series over Q(z).