Counting rational curves on K3 surfaces

Abstract

The aim of these notes is to explain the remarkable formula found by Yau and Zaslow to express the number of rational curves on a K3 surface. Projective K3 surfaces fall into countably many families F(g) (g>0); a surface in F(g) admits a g-dimensional linear system of curves of genus g. Such a system contains a positive number, say n(g), of rational (highly singular) curves. The formula is Σ n(g) qg = q/D((q), where D(q) = q Π (1-qn)24 is the well-known modular form of weight 12.

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