Odd zeta motive and linear forms in odd zeta values

Abstract

We study a family of mixed Tate motives over Z whose periods are linear forms in the zeta values ζ(n). They naturally include the Beukers-Rhin-Viola integrals for ζ(2) and the Ball-Rivoal linear forms in odd zeta values. We give a general integral formula for the coefficients of the linear forms and a geometric interpretation of the vanishing of the coefficients of a given parity. The main underlying result is a geometric construction of a minimal ind-object in the category of mixed Tate motives over Z which contains all the non-trivial extensions between simple objects. In a joint appendix with Don Zagier, we prove the compatibility between the structure of the motives considered here and the representations of their periods as sums of series.