Point g\'en\'erique et saut du rang du groupe de Mordell-Weil

Abstract

Let k be a number field and U a smooth integral k-variety. Let X U be an abelian scheme. We consider the set R of rational points m ∈ U(k) such that the Mordell-Weil rank of the fibre Um is strictly bigger than the Mordell-Weil rank of the generic fibre. We prove the following results. If the k-variety X is k-unirational, then R is dense for the Zariski topology on U. If X is k-rational, then R is not thin in U. This generalizes results of Billard and of Salgado. The main idea goes back to N\'eron's thesis: use the generic point of the generic fibre of the family.