The flex divisor of a K3 surface
Abstract
The flex divisor of a primitively polarized K3 surface (X,L) of degree L2=2d is, generically, the locus of all points x∈ X for which there exists a pencil V⊂ |L| whose base locus is \x\. We show that the flex divisor lies in the linear system |ndL| where nd=(2d+1)C(d)2 and C(d) is the Catalan number. We also show that there is a well-defined notion of flex divisor over the whole moduli space F2d of polarized K3 surfaces.
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