Weak approximation for Fano complete intersections in positive characteristic

Abstract

For a smooth curve B over an algebraically closed field k, for every B-flat complete intersection XB in B×Spec\ k Pnk of type (d1,…,dc), if the Fano index is ≥ 2 and if char(k)>(d1,…,dc), we prove weak approximation of OB,b-points of XB by k(B)-points at all places of (strong) potentially good reduction, including all places of good reduction. The key step is the proof that such complete intersections are separably uniruled by lines, and even separably rationally connected, whenever smooth. We prove that the inequality is close to sharp. We prove a similar theorem for Fano manifolds of Picard number 1 and Fano index 1.