The exceptional locus in the Bertini irreducibility theorem for a morphism

Abstract

We introduce a novel approach to Bertini irreducibility theorems over an arbitrary field, based on random hyperplane slicing over a finite field. Extending a result of Benoist, we prove that for a morphism φ X Pn such that X is geometrically irreducible and the nonempty fibers of φ all have the same dimension, the locus of hyperplanes H such that φ-1 H is not geometrically irreducible has dimension at most codim φ(X)+1. We give an application to monodromy groups above hyperplane sections.