K3 curves with index k>1

Abstract

Let KCg k be the moduli stack of pairs (S,C) with S a K3 surface and C⊂ S a genus g curve with divisibility k in Pic(S). In this article we study the forgetful map cgk:(S,C) C from KCg k to Mg for k>1. First we compute by geometric means the dimension of its general fibre. This turns out to be interesting only when S is a complete intersection or a section of a Mukai variety. In the former case we find the existence of interesting Fano varieties extending C in its canonical embedding. In the latter case this is related to delicate modular properties of the Mukai varieties. Next we investigate whether cgk dominates the locus in Mg of k-spin curves with the appropriate number of independent sections. We are able to do this only when S is a complete intersection, and obtain in these cases some classification results for spin curves.