Grothendieck-Lefschetz Theory, Set-Theoretic Complete Intersections and Rational Normal Scrolls

Abstract

Using the Grothendieck-Lefschetz theory (see [SGA2]) we prove a criterion to deduce that certain subvarieties of Pn of dimension ≥ 2 are not set-theoretic complete intersections (see Theorem 1 of the Introduction). As applications we give a number of relevant examples. In the last part of the paper we prove that the arithmetic rank of a rational normal d-dimensional scroll Sn1,...,nd in PN is N-2, by producing an explicit set of N-2 homogeneous equations which define these scrolls set-theoretically (see Theorem 2 of the Introduction).