Large unions of generalized integral sections on elliptic surfaces

Abstract

Let f X B be a nonisotrivial complex elliptic surface and let D ⊂ X be an integral divisor dominating B. We study finiteness related properties of generalized (S, D)-integral sections σ B X of X. These integral sections σ correspond to rational points in A(K) which satisfy the set-theoretic condition f ( σ(B) D)⊂ S, where S ⊂ B is an arbitrary given subset. For S ⊂ B finite, the set of (S, D)-integral sections of X is finite by the well-known Siegel theorem. In this article, we establish a general quantitative finiteness result of several large unions of (S, D)-integral sections in which both the subset S and the divisor D are allowed to vary in families where notably S is not necessarily finite nor countable. Some applications to generalized unit equations over function fields are also given.