Euler's factorial series at algebraic integer points

Abstract

We study a linear form in the values of Euler's series F(t)=Σn=0∞ n!tn at algebraic integer points α1, …, αm ∈ ZK belonging to a number field K. Let v|p be a non-Archimedean valuation of K. Two types of non-vanishing results for the linear form v = λ0 + λ1 Fv(α1) + … + λm Fv(αm), λi ∈ ZK, are derived, the second of them containing a lower bound for the v-adic absolute value of v. The first non-vanishing result is also extended to the case of primes in residue classes. On the way to the main results, we present explicit Pad\'e approximations to the generalised factorial series Σn=0∞ ( Πk=0n-1 P(k) ) tn, where P(x) is a polynomial of degree one.