Stable maps and singular curves on K3 surfaces

Abstract

In this thesis we study singular curves on K3 surfaces. Let Bg denote the stack of polarised K3 surfaces of genus g and set p(g,k)=k2(g-1)+1. There is a stack Tng,k Bg with fibre over the polarised surface (X,L) parametrising all unramified morphisms f: C X, birational onto their image, with C an integral smooth curve of genus p(g,k)-n and f*C kL. One can think of Tng,k as parametrising all singular curves on K3 surfaces such that the normalisation map is unramified (or equivalently such that the curve has "immersed" singularities). The stack Tng,k comes with a natural moduli map η \; : \;Tng,k Mp(g,k)-n to the Deligne-Mumford stack of curves, defined by forgetting the map to the K3 surface. We first show that η is generically finite (to its image) on at least one component of Tng,k , in all but finitely many values of p(g,k)-n. We also consider related questions about the Brill-Noether theory of singular curves on K3 surfaces as well as the surjectivity of twisted Gaussian maps on normalisations of singular curves. Lastly, we apply the deformation theory of Tng,k to a seemingly unrelated problem, namely the Bloch-Beilinson conjectures on the Chow group of points of K3 surfaces with a symplectic involution.