Projective varieties of maximal sectional regularity

Abstract

We study projective varieties X ⊂ Pr of dimension n ≥ 2, of codimension c ≥ 3 and of degree d ≥ c + 3 that are of maximal sectional regularity, i.e. varieties for which the Castelnuovo-Mumford regularity (C) of a general linear curve section is equal to d -c+1, the maximal possible value (see GruLPe). As one of the main results we classify all varieties of maximal sectional regularity. If X is a variety of maximal sectional regularity, then either (a) it is a divisor on a rational normal (n+1)-fold scroll Y ⊂ Pn+3 or else (b) there is an n-dimensional linear subspace F ⊂ Pr such that X F ⊂ F is a hypersurface of degree d-c+1. Moreover, suppose that n = 2 or the characteristic of the ground field is zero. Then in case (b) we obtain a precise description of X as a birational linear projection of a rational normal n-fold scroll.