Subvarieties of generic hypersurfaces in any variety
Abstract
Let W be a projective variety of dimension n+1, L a free line bundle on W, X in H0(Ld) a hypersurface of degree d which is generic among those given by sums of monomials from L, and let f : Y X be a generically finite map from a smooth m-fold Y. We suppose that f is r-filling, i.e. upon deforming X in H0(Ld), f deforms in a family such that the corresponding deformations of Yr dominate Wr. Under these hypotheses we give a lower bound for the dimension of a certain linear system on the Cartesian product Yr having certain vanishing order on a diagonal locus as well as on a double point locus. This yields as one application a lower bound on the dimension of the linear system |KY - (d - n + m)f*L - f*KW| which generalizes results of Ein and Xu (and in weaker form, Voisin). As another perhaps more surprising application, we conclude a lower bound on the number of quadrics containing certain projective images of Y.
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