On the dimension of Voisin sets in the moduli space of abelian varieties

Abstract

We study the subsets Vk(A) of a complex abelian variety A consisting in the collection of points x∈ A such that the zero-cycle \x\-\0A\ is k-nilpotent with respect to the Pontryagin product in the Chow group. These sets were introduced recently by Voisin and she showed that Vk(A) ≤ k-1 and Vk(A) is countable for a very general abelian variety of dimension at least 2k-1. We study in particular the locus Vg,2 in the moduli space of abelian varieties of dimension g with a fixed polarization, where V2(A) is positive dimensional. We prove that an irreducible subvariety Y ⊂ Vg,2, g 3, such that for a very general y ∈ Y there is a curve in V2(Ay) generating A satisfies Y 2g - 1. The hyperelliptic locus shows that this bound is sharp.