On the Bombieri-Lang Conjecture over finitely generated fields

Abstract

The strong Bombieri-Lang conjecture postulates that, for every variety X of general type over a field k finitely generated over Q, there exists an open subset U⊂ X such that U(K) is finite for every finitely generated extension K/k. The weak Bombieri-Lang conjecture postulates that, for every positive dimensional variety X of general type over a field k finitely generated over Q, the rational points X(k) are not dense. Furthermore, Lang conjectured that every variety of general type X over a field of characteristic 0 contains an open subset U⊂ X such that every subvariety of U is of general type, this statement is usually called geometric Lang conjecture. We reduce the strong Bombieri-Lang conjecture to the case k=Q. Assuming the geometric Lang conjecture, we reduce the weak Bombieri-Lang conjecture to k=Q, too.