Varieties of Picard rank one as components of ample divisors

Abstract

Let V be an integral normal complex projective variety of dimension n≥ 3 and denote by L an ample line bundle on V. By imposing that the linear system |L| contains an element A=A1+...+Ar, r≥ 1, where all the Ai's are distinct effective Cartier divisors with Pic(Ai)=Z, we show that such a V is as special as the components Ai of A∈ |L|. After making a list of some consequences about the positivity of the components Ai, we characterize pairs (V, L) as above when either A1n-1 and Pic(Aj)=Z for j=2,...,r, or V is smooth and each Ai is a variety of small degree with respect to [Hi]Ai, where [Hi]Ai is the restriction to Ai of a suitable line bundle Hi on V.