On the motivic commutative ring spectrum BO

Abstract

We construct an algebraic commutative ring T- spectrum BO which is stably fibrant and (8,4)- periodic and such that on SmOp/S the cohomology theory (X,U) -> BOp,q(X+/U+) and Schlichting's hermitian K-theory functor (X,U) -> KO[q]2q-p(X,U) are canonically isomorphic. We use the motivic weak equivalence Z x HGr -> KSp relating the infinite quaternionic Grassmannian to symplectic K-theory to equip BO with the structure of a commutative monoid in the motivic stable homotopy category. When the base scheme is Spec Z[1/2], this monoid structure and the induced ring structure on the cohomology theory BO*,* are the unique structures compatible with the products KO[2m]0(X) x KO[2n]0(Y) -> KO[2m+2n]0(X x Y). on Grothendieck-Witt groups induced by the tensor product of symmetric chain complexes. The cohomology theory is bigraded commutative with the switch map acting on BO*,*(T2) in the same way as multiplication by the Grothendieck-Witt class of the symmetric bilinear space <-1>.