Modified diagonals and linear relations between small diagonals

Abstract

We prove that the vanishings of the modified diagonal cycles of Gross and Schoen govern the Z-linear relations between small m-diagonals pt\1,…,n\ A×A in the rational Chow ring of Xn for A ranging over m-element subsets of \1,…,n\. Our results generalize to arbitrary symmetric classes in place of the diagonal in Xm, and with different types of inclusions A(Xm)QSm A(Xn)Q. The combinatorial heart of this paper, which may be of independent interest, is showing the Z-linear relations between elementary symmetric polynomials ek(xa1,…,xam) ∈ Z[x1,…,xn] are generated by the Sn-translates of a certain alternating sum over the facets of a hyperoctahedron.