Bounds on the Torsion Subgroups of N\'eron-Severi Group Schemes

Abstract

Let X Pr be a smooth projective variety defined by homogeneous polynomials of degree ≤ d over an algebraically closed field. Let Pic\, X be the Picard scheme of X. Let Pic0 X be the identity component of Pic\, X. The N\'eron--Severi group scheme of X is defined by NS\, X = (Pic\, X)/(Pic0 X)red. We give an explicit upper bound on the order of the finite group scheme (NS\, X)tor in terms of d and r. As a corollary, we give an upper bound on the order of the finite group π1et(X,x0)abtor. We also show that the torsion subgroup (NS\, X)tor of the N\'eron--Severi group of X is generated by less than or equal to (deg\, X -1)(deg\, X - 2) elements in various situations.