A note on the irrationality of ζ2(5)

Abstract

In a spirit of Apéry's proof of the irrationality of ζ(3), we construct a sequence pn/qn of rational approximations to the 2-adic zeta value ζ2(5) which satisfy 0 < |ζ2(5)-pn/qn|2 < \|pn|,|qn|\-1-δ for an explicit constant δ>0. This leads to a new proof of the irrationality of ζ2(5), the result established recently by Calegari, Dimitrov and Tang using a different method. Furthermore, our approximations allow us to obtain an upper bound for the irrationality measure of this 2-adic quantity; namely, we show that μ(ζ2(5)) (162)/(82-5) = 20.342….