Universal birational invariants and A1-homology

Abstract

Let k be a field admitting a resolution of singularities. In this paper, we prove that the functor of zeroth A1-homology HA10 is universal as a functorial birational invariant of smooth proper k-varieties taking values in a category enriched by abelian groups. For a smooth proper k-variety X, we also prove that the dimension of HA10(X;Q)(Spec k) coincides with the number of R-equivalence classes of X(k). We deduce these results as consequences of the structure theorem that for a smooth proper k-variety X, the sheaf HA10(X) is the free abelian presheaf generated by the birational A1-connected components π0bA1(X) of Asok-Morel.