On the discriminant locus of a generic projection

Abstract

For a smooth projective variety X⊂eq PN over an algebraically closed field of char 0, we show that the discriminant locus of a generic projection of X is projectively dual to a general linear section of the dual variety, and deduce a purity statement for the discriminant. Over C, we also show that the fundamental group of the complement of the branch divisor arising from generic projection of a normal hypersurface surjects onto a braid group via braid monodromy.

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