Specializations of elliptic surfaces, and divisibility in the Mordell-Weil group

Abstract

Let E be an elliptic surface over the curve C, defined over a number field k, let P be a section of E, and let be a rational prime. For any non-singular fibre Et, we bound the number of points Q on Et of (algebraic) degree at most D over k, such that n Q=Pt, for some n≥ 1. The bound obtained depends only on , the surface and section in question, D, and the degree [k(t):k]; that is, it is uniform across all fibres of bounded degree. In special cases, we obtain more specific, in some instances sharp, bounds.