A partial result towards the Chowla--Milnor conjecture

Abstract

The Chowla--Milnor conjecture predicts the linear independence of certain Hurwitz zeta values. In this paper, we prove that for any fixed integer k ≥slant 2, the dimension of the Q-linear span of ζ(k,a/q)-(-1)kζ(k,1-a/q) (1 ≤slant a < q/2, (a,q)=1) is at least (c -o(1)) · q as the positive integer q +∞ for some absolute constant c>0. It is well known that ζ(k,a/q)+(-1)kζ(k,1-a/q) ∈ Qπk, but much less is known previously for ζ(k,a/q)-(-1)kζ(k,1-a/q). Our proof is similar to those of Ball--Rivoal (2001) and Zudilin (2002) concerning the linear independence of Riemann zeta values. However, we use a new type of rational functions to construct linear forms.