Low degree rational curves on quasi-polarized K3 surfaces
Abstract
We prove that there are at most (24-r0) low-degree rational curves on high-degree models of K3 surfaces with at most Du Val singularities, where r0 is the number of exceptional divisors on the minimal resolution. We also provide several existence results in the above setting (i.e. for rational curves on quasi-polarized K3 surfaces), which imply that for various values of r0 our bound cannot be improved.
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