Some new results on modified diagonals

Abstract

O'Grady studied recently m-th modified diagonals for a smooth projective variety, generalizing the Gross-Schoen modified small diagonal. These cycles m(X,a) depend on a choice of reference point a∈ X (or more generally a degree 1 zero-cycle). We prove that for any X,a, the cycle m(X,a) vanishes for large m. We also prove the following conjecture of O'Grady: if X is a double cover of Y and m(Y,a) vanishes (where a belongs to the branch locus), then 2m-1(X,a) vanishes, and we provide a generalization to higher degree finite covers. We finally prove the vanishing n+1(X,oX)=0 when X=S[m], S a K3 surface, and n=2m, which was conjectured by O'Grady and proved by him for m=2,3.