Irrationality of special values of formal Laurent series represented by the formal Mellin transform of G-functions

Abstract

Let p be a prime number and Cp the completion of algebraic closure of Qp. Let K be an algebraic number field. We fix an embedding p:Q Cp and denote Kp the completion of K with respect to the embedding p. Let g(z)∈ K[[z]] and denote by M(g)(z)∈ 1zK[[1z]] the formal Mellin transform of g(z). In this article, we prove that if M(g)(z) has a good Pad\'e approximation, the special values M(g)(α) are convergent in Kp and irrational for infinitely many α ∈ Q (Qp Zp) satisfying certain conditions. This result can be regarded as a partial generalization of the method of Beukers in his proof the irrationality of special values of p-adic Hurwitz zeta functions.