Finite translation orbits on double families of abelian varieties (with an appendix by E. Amerik)

Abstract

We study two families of g-dimensional abelian varieties, induced by distinct rational maps defined on a common variety A and mapping to two bases S1 and S2. Two non-torsion sections induce birational fiberwise translations on A. We consider the action of a specific subset of the group generated by these translations. Under the assumption that dim S1 (= dim S2) ≤ g, we prove that the points with finite orbit are contained in a proper Zariski closed subset. This subset is explicitly described to a certain extent. Our results generalize a theorem of Corvaja, Tsimermann, and Zannier to higher dimensions.