Specialization of N\'eron-Severi groups in characteristic p

Abstract

Andr\'e and Maulik--Poonen proved that for any smooth proper family X B of varieties over an algebraically closed field of characteristic 0, there is a closed fiber whose N\'eron-Severi group has the same rank as that of the N\'eron-Severi group of the geometric generic fiber. We prove the analogous statement over algebraically closed fields of characteristic p>0 which are not isomorphic to Fp. Furthermore, we prove that for any algebraically closed field k of characteristic p>0 and smooth proper family X B of k-varieties, there exists a dense open subvariety U⊂eq B and integer N such that for each map x:Spec\, k[[t]] U, the p-torsion in the cokernel of the specialization map from the N\'eron-Severi group of the pullback of X to the geometric generic fiber of x to the N\'eron-Severi group of the pullback of X to the special fiber of x is killed by pN. Finally, we prove that for a curve C over k and family XB of smooth C-schemes, there exists a dense Zariski open U⊂eq B such that for a local uniformizer t at any closed point of C, the rank of the N\'eron-Severi group jumps only on a t-adic nowhere dense set t. The crystalline Lefschetz (1,1) theorem of Morrow is a key ingredient in the proofs.