\'Etale monodromy and rational equivalence for 1-cycles on cubic hypersurfaces in P5

Abstract

Let k be an uncountable algebraically closed field of characteristic 0, and let X be a smooth projective connected variety of dimension 2p, appropriately embedded into Pm over k. Let Y be a hyperplane section of X, and let Ap(Y) and Ap+1(X) be the groups of algebraically trivial algebraic cycles of codimension p and p+1 modulo rational equivalence on Y and X respectively. Assume that, whenever Y is smooth, the group Ap(Y) is regularly parametrized by an abelian variety A and coincides with the subgroup of degree 0 classes in the Chow group CHp(Y). In the paper we prove that the kernel of the push-forward homomorphism from Ap(Y) to Ap+1(X) is the union of a countable collection of shifts of a certain abelian subvariety A0 inside A. For a very general section Y either A0=0 or A0 coincides with an abelian subvariety A1 in A whose tangent space is the group of vanishing cycles H2p-1(Y) van. Then we apply these general results to sections of a smooth cubic fourfold in P5.