Chow rings and gonality of general abelian varieties

Abstract

We study the (covering) gonality of abelian varieties and their orbits of zero-cycles for rational equivalence. We show that any orbit for rational equivalence of zero-cycles of degree k has dimension at most k-1. Building on the work of Pirola, we show that very general abelian varieties of dimension g have covering gonality k≥ f(g) where f(g) grows like log\,g. This answers a question asked by Bastianelli, De Poi, Ein, Lazarsfeld and B. Ullery. We also obtain results on the Chow ring of very general abelian varieties, eg. if g≥ 2k-1, for any divisor D∈ Pic0(A), Dk is not a torsion cycle.