A note on the number of irrational odd zeta values

Abstract

It is proved that, for all odd integer s ≥slant s0(), there are at least ( c0 - ) s1/2( s)1/2 many irrational numbers among the following odd zeta values: ζ(3),ζ(5),ζ(7),·s,ζ(s). The constant c0 = 1.192507… can be expressed in closed form. The work is based on the previous work of Fischler, Sprang and Zudilin [FSZ19], improves the lower bound 2(1-) s s therein. The main new ingredient is an optimal design for the zeros of the auxiliary rational functions, which relates to the inverse of Euler totient funtion.