The classifying topos of a group scheme and invariants of symmetric bundles

Abstract

Let Y be a scheme in which 2 is invertible and let V be a rank n vector bundle on Y endowed with a non-degenerate symmetric bilinear form q. The orthogonal group O(q) of the form q is a group scheme over Y whose cohomology ring H*(B O(q), Z/2 Z) AY[HW1(q),..., HWn(q)] is a polynomial algebra over the \'etale cohomology ring AY:=H*(Yet, Z/2 Z) of the scheme Y. Here the HWi(q)'s are Jardine's universal Hasse-Witt invariants and B O(q) is the classifying topos of O(q) as defined by Grothendieck and Giraud. The cohomology ring H*(B O(q), Z/2 Z) contains canonical classes det[q] and [Cq] of degree 1 and 2 respectively, which are obtained from the determinant map and the Clifford group of q. The classical Hasse-Witt invariants wi(q) live in the ring AY. Our main theorem provides a computation of det[q] and [Cq] as polynomials in HW1(q) and HW2(q) with coefficients in AY written in terms of w1(q),w2(q)∈ AY. This result is the source of numerous standard comparison formulas for classical Hasses-Witt invariants of quadratic forms. Our proof is based on computations with (abelian and non-abelian) Cech cocycles in the topos B O(q). This requires a general study of the cohomology of the classifying topos of a group scheme, which we carry out in the first part of this paper.