Counting rational curves with multiple points and Gromov-Witten invariants of blow-ups
Abstract
We study Gromov-Witten invariants on the blow-up of Pn at a point, which is probably the simplest example of a variety whose moduli spaces of stable maps do not have the expected dimension. It is shown that many of these invariants can be interpreted geometrically on Pn as certain numbers of rational curves having a multiple point of given order at the blown up point. Moreover, all these invariants can actually be calculated, giving enumerative invariants of Pn which have not been known before.
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