Irrationality of values of L-functions of Dirichlet characters

Abstract

In a recent paper with Sprang and Zudilin, the following result was proved: if a is large enough in terms of >0, then at least 2(1-) a a values of the Riemann zeta function at odd integers between 3 and a are irrational. This improves on the Ball-Rivoal theorem, that provides only 1-1+ 2 a such irrational values -- but with a stronger property: they are linearly independent over the rationals.In the present paper we generalize this recent result to both L-functions of Dirichlet characters and Hurwitz zeta function. The strategy is different and less elementary: the construction is related to a Pad\'e approximation problem, and a generalization of Shidlovsky's lemma is used to apply Siegel's linear independence criterion. We also improve the analogue of the Ball-Rivoal theorem in this setting: we obtain 1-1+ 2 a linearly independent values L(f,s) with s≤ a of a fixed parity, when f is a Dirichlet character. The new point here is that the constant 1+ 2 does not depend on f.