An explicit KO-degree map and applications

Abstract

The goal of this note is to study the analog in unstable A1-homotopy theory of the unit map from the motivic sphere spectrum to the Hermitian K-theory spectrum, i.e., the degree map in Hermitian K-theory. We show that "Suslin matrices", which are explicit maps from odd dimensional split smooth affine quadrics to geometric models of the spaces appearing in Bott periodicity in Hermitian K-theory, stabilize in a suitable sense to the unit map. As applications, we deduce that KMWi(F) = GWii(F) for i ≤ 3, which can be thought of as an extension of Matsumoto's celebrated theorem describing K2 of a field. These results provide the first step in a program aimed at computing the sheaf πn A1( An 0) for n ≥ 4.