Intersecting the torsion of elliptic curves

Abstract

In 2007, Bogomolov and Tschinkel proved that given two complex elliptic curves E1 and E2 along with even degree-2 maps πj Ej P1 having different branch loci, the intersection of the image of the torsion points of E1 and E2 under their respective πj is finite. They conjectured (also in works with Fu) that the cardinality of this intersection is uniformly bounded independently of the elliptic curves. As it has been observed in the literature, the recent proof of the Uniform Manin-Mumford conjecture implies a full solution of the Bogomolov-Fu-Tschinkel conjecture. In this work we prove a generalization of the Bogomolov-Fu-Tschinkel conjecture where instead of even degree-2 maps one can use any rational functions of bounded degree on the elliptic curves as long as they have different branch loci. Our approach combines Nevanlinna theory with the Uniform Manin-Mumford conjecture. With similar techniques, we also prove a result on lower bounds for ranks of elliptic curves over number fields.