A note on rational curves on general Fano hypersurfaces
Abstract
We show the Kontsevich space of rational curves of degree at most roughly 2-22n on a general hypersurface X⊂ Pn of degree n-1 is equidimensional of expected dimension and has two components: one consisting generically of smooth, embedded rational curves and the other consisting of multiple covers of a line. This proves more cases of a conjecture of Coskun, Harris, and Starr and shows the Gromov-Witten invariants in these cases are enumerative.
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