On symplectic automorphisms of a surface with genus two fibration and their action on CH0

Abstract

Let S be a complex smooth projective surface with a genus two fibration, and Auts(S) the group of symplectic automorphisms, fixing every holomorphic 2-forms (if any) on S. Based on the work of Jin-Xing Cai, we observe in this paper that, if (OS)≥ 5, then |Auts(S)|≤ 2. Then we go on to verify, under some conditions, that Auts(S) acts trivially on the Albanese kernel CH0(S)alb of the 0-th Chow group, which is predicted by a conjecture of Bloch and Beilinson. As a consequence, if an automorphism σ∈ Aut(S) acts trivially on Hi,0(S) for 0≤ i≤ 2, then it also acts trivially on CH0(S)alb.