On the Chow ring of very general abelian varieties and a question of Pirola

Abstract

We prove that for a very general abelian variety of dimension ≥ 4, a divisor D∈ CH1(A) that satisfies D2=0 in CH2(A) is of torsion. The same result is also established for a very general Jacobian in genus 4. We use then the second statement in order to prove a conjecture of Pirola, which states that any rational section of the Kummer fibration K=J/ Id→ M4, where J→ M4 is the Jacobian fibration, must be a multiple of the Griffiths-Pirola section given by the difference of the two trigonal divisors.

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