Non-Abelian Lefschetz Hyperplane Theorems

Abstract

Let X be a smooth projective variety over the complex numbers, and let D be an ample divisor in X. For which spaces Y is the restriction map r: Hom(X, Y) -> Hom(D, Y) an isomorphism? Using positive characteristic methods, we give a fairly exhaustive answer to this question. An example application of our techniques is: if dim(X) > 2, Y is smooth, the cotangent bundle of Y is nef, and dim(Y) < dim(D), the restriction map r is an isomorphism. Taking Y to be the classifying space of a finite group BG, the moduli space of pointed curves Mg,n, the moduli space of principally polarized Abelian varieties Ag, certain period domains, and various other moduli spaces, one obtains many new and classical Lefschetz hyperplane theorems.