Codimension two integral points on some rationally connected threefolds are potentially dense

Abstract

Let V be a smooth, projective, rationally connected variety, defined over a number field k, and let Z⊂ V be a closed subset of codimension at least two. In this paper, for certain choices of V, we prove that the set of Z-integral points is potentially Zariski dense, in the sense that there is a finite extension K of k such that the set of points P∈ V(K) that are Z-integral is Zariski dense in V. This gives a positive answer to a question of Hassett and Tschinkel from 2001.