Representability of Chow groups of codimension three cycles

Abstract

In this note we are going to prove that if we have a fibration of smooth projective varieties X S over a surface S such that X is of dimension four and that the geometric generic fiber has finite dimensional motive and the first \'etale cohomology of the geometric generic fiber with respect to Ql coefficients is zero and the second \'etale cohomology is spanned by divisors, then A3(X) (codimension three algebraically trivial cycles modulo rational equivalence) is dominated by finitely many copies of A0(S). Meaning that there exists finitely many correspondences i on S× X, such that Σi i is surjective from A2(S) to A3(X).