On the Genus-One Gromov-Witten Invariants of Complete Intersection Threefolds
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چکیده
We express the genus-one degree-d GW-invariant of a projective complete intersection threefold in terms of the genus-zero degree-d GW-invariant and the integral of a natural class on the main component of the moduli space of genus-one degree-d stable maps into the corresponding projective space P. This integral is computable via the classical localization theorem. The method described in this paper should be applicable to computing the GW-invariants in many other situations as well.
منابع مشابه
Real Gromov-Witten Theory in All Genera and Real Enumerative Geometry: Computation
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