Spaces of rational curves in complete intersections
Abstract
We prove that the space of smooth rational curves of degree e in a general complete intersection of multidegree (d1, ..., dm) in n is irreducible of the expected dimension if Σi=1m di <2n3 and n is large enough. This generalizes the results of Harris, Roth and Starr hrs, and is achieved by proving that the space of conics passing through any point of a general complete intersection has constant dimension if Σi=1m di is small compared to n.
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