A Lefschetz theorem for intersections with projective varieties

Abstract

One version of the classical Lefschetz hyperplane theorem states that for U ⊂ Pn a smooth quasi-projective variety of dimension at least 2, and H U a general hyperplane section, the resulting map on \'etale fundamental groups π1(H U) → π1(U) is surjective. We prove a generalization, replacing the hyperplane by a general PGLn+1-translate of an arbitrary projective variety: If U ⊂ Pn is a normal quasi-projective variety, X is a geometrically irreducible projective variety of dimension at least n + 1 - U, and Y is a general PGLn+1-translate of X, then the map π1(Y U) → π1(U) is surjective.