Triple solids and scrolls

Abstract

Let Y be a smooth projective variety of dimension n ≥ 2 endowed with a finite morphism φ:Y Pn of degree 3, and suppose that Y, polarized by some ample line bundle, is a scroll over a smooth variety X of dimension m. Then n ≤ 3 and either m=1 or 2. When m=1, a complete description of the few varieties Y satisfying these conditions is provided. When m=2, various restrictions are discussed showing that in several instances the possibilities for such a Y reduce to the single case of the Segre product P2 × P1. This happens, in particular, if Y is a Fano threefold as well as if the base surface X is P2.

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