On the locus of curves mapping to a fixed target
Abstract
Suppose Y is a smooth variety equipped with a top form. We prove a simple theorem giving a sharp lower bound on the geometric genus of a family of subvarieties of Y, in terms of the dimension of this family. Two elementary applications are presented. On the one hand, we show that for a very general curve C and a very general hypersurface Y⊂ Pn+1 of degree 2n+1, any map C Y is constant. On the other hand, we give a lower bound on the genus of a family of curves with an isotrivial factor in the associated family of Jacobians; we also characterize the families of curves attaining this bound as the families of degree 2 branched covers of a fixed curve.
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