Maximal orthogonal grassmannians of quadratic forms of dimensions up to 22

Abstract

Let X be a connected component of the maximal orthogonal grassmannian of a generic n-dimensional quadratic form q with trivial Clifford invariant. Consider the canonical epimorphism φ from the Chow ring of X to the associated graded ring of the coniveau filtration on the Grothendieck ring of X. In Kar2018 Karpenko proved that φ is an isomorphism for all n≤ 12 (conjecturally for all n). Recently, in Yagita Yagita showed that φ is not an isomorphism for n=17, 18. In the present paper, together with Yagita's results for n=17,18, we show that the map φ is not an isomorphism for all 13≤ n≤ 22. In particualr, the case n=13 gives the smallest dimensional maximal orthogonal grassmannian whose two graded rings are not isomorphic.