Singular intersections in families of abelian varieties

Abstract

Let S be a smooth irreducible curve defined over Q, let A be an abelian scheme over S and C a curve inside A, both defined over Q. In this paper we prove that the set of points in which C intersects proper flat subgroup schemes of A tangentially is finite. The crucial case of elliptic curves already follows from a result by Corvaja, Demeio, Masser and Zannier: in this case we provide an alternative proof using the Pila-Zannier method. Such a proof may lead to an effective result using an effective point-counting theorem. This fits in the framework of the so-called problems of unlikely intersections, and can be seen as a variation of the relative Pink conjecture for abelian varieties.