Remarks on the CH2 of cubic hypersurfaces

Abstract

This paper presents two approaches to reducing problems on 2-cycles on a smooth cubic hypersurface X over an algebraically closed field of characteristic ≠ 2, to problems on 1-cycles on its variety of lines F(X). The first one relies on bitangent lines of X and Tsen-Lang theorem. It allows to prove that CH2(X) is generated, via the action of the universal P1-bundle over F(X), by CH1(F(X)). When the characteristic of the base field is 0, we use that result to prove that if dim(X)≥ 7, then CH2(X) is generated by classes of planes contained in X and if dim(X)≥ 9, then CH2(X) Z. Similar results, with slightly weaker bounds, had already been obtained by Pan. The second approach consists of an extension to subvarieties of X of higher dimension of an inversion formula developped by Shen in the case of curves of X. This inversion formula allows to lift torsion cycles in CH2(X) to torsion cycles in CH1(F(X)). For complex cubic 5-folds, it allows to prove that the birational invariant provided by the group CH3(X)tors,AJ of homologically trivial, torsion codimension 3 cycles annihilated by the Abel-Jacobi morphism is controlled by the group CH1(F(X))tors,AJ which is a birational invariant of F(X), possibly always trivial for Fano varieties.