Greatest common divisors of integral points of numerically equivalent divisors

Abstract

We generalize the G.C.D. results of Corvaja--Zannier and Levin on Gmn to more general settings. More specifically, we analyze the height of a closed subscheme of codimension at least 2 inside an n-dimensional Cohen-Macaulay projective variety, and show that this height is small when evaluated at integral points with respect to a divisor D when D is a sum of n+1 effective divisors which are all numerically equivalent to some multiples of a fixed ample divisor. Our method is inspired by Silverman's G.C.D. estimate as an application of Vojta's conjecture, which is substituted by a more general version of Schmidt's subspace theorem of Ru--Vojta in our proof.