Positivity Results for spaces of rational curves
Abstract
Let X be a very general hypersurface of degree d in Pn. We investigate positivity properties of the spaces Re(X) of degree e rational curves in X. We show that for small e, Re(X) has no rational curves meeting the locus of smooth embedded curves. We show that for n ≤ d, there are no rational curves in the locus Y ⊂ X swept out by lines. And we exhibit differential forms on a smooth compactification of Re(X) for every e and n-2 ≥ d ≥ n+12.
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