Gromov-Witten theory of K3 × P1 and quasi-Jacobi forms

Abstract

Let S be a K3 surface with primitive curve class β. We solve the relative Gromov-Witten theory of S × P1 in classes (β,1) and (β,2). The generating series are quasi-Jacobi forms and equal to a corresponding series of genus 0 Gromov-Witten invariants on the Hilbert scheme of points of S. This proves a special case of a conjecture of Pandharipande and the author. The new geometric input of the paper is a genus bound for hyperelliptic curves on K3 surfaces proven by Ciliberto and Knutsen. By exploiting various formal properties we find that a key generating series is determined by the very first few coefficients. Let E be an elliptic curve. As collorary of our computations we prove that Gromov-Witten invariants of S × E in classes (β,1) and (β,2) are coefficients of the reciprocal of the Igusa cusp form. We also calculate several linear Hodge integrals on the moduli space of stable maps to a K3 surface and the Gromov-Witten invariants of an abelian threefold in classes of type (1,1,d).