Affine representability of quadrics revisited

Abstract

The quadric Q2n is the Z-scheme defined by the equation Σi=1n xi yi = z(1-z). We show that Q2n is a homogeneous space for the split reductive group scheme SO2n+1 over Z. The quadric Q2n is known to have the A1-homotopy type of a motivic sphere and the identification as a homogeneous space allows us to give a characteristic independent affine representability statement for motivic spheres. This last observation allows us to give characteristic independent comparison results between Chow--Witt groups, motivic stable cohomotopy groups and Euler class groups.