Nodal elliptic curves on K3 surfaces

Abstract

Let (X,L) be a general primitively polarized K3 surface with c1(L)2 = 2g-2 for some integer g ≥ 2. The Severi variety VL,δ ⊂ |L| is defined to be the locus of reduced and irreducible curves in |L| with exactly δ nodes and no other singularities. When δ=g, any curve C ∈ VL,g is a rational curve; in fact, Chen Chen02 has shown that all rational curves in |L| are nodal, and the number of such rational curves is given by the Yau-Zaslow formula YZ96. In this paper, we consider the next case where δ = g-1 and the Severi variety VL,g-1 parametrizing nodal elliptic curves is of dimension 1. Let VL,g-1 ⊂ |L| denote the Zariski closure. For a reduced curve C, we define the geometric genus of C to be the sum of the genera of the irreducible components of the normalization. We prove that the geometric genus of the closure VL,g-1 ⊂ |L| is bounded from below by O(eCg).