Gromov-Witten invariants via algebraic geometry. Nuclear Phys (1996) [1 citations — 0 self]
by Sheldon Katz
B Proc. Suppl
http://www.math.okstate.edu/preprint/1995/9.ps
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Abstract:
Calculations of the number of curves on a Calabi-Yau manifold via an instanton expansion do not always agree with what one would expect naively. It is explained how to account for continuous families of instantons via deformation theory and excess intersection theory. The essential role played by degenerate instantons is also explained. 1
Citations
| 248 | Intersection theory – Fulton |
| 5 | Towards the mirror symmetry for Calabi-Yau complete intersections in Gorenstein toric Fano varieties – Borisov - 1993 |
| 3 | Mirror Symmetry for Generic Hypersurfaces in Weighted Projective Spaces, in preparation – Berglund, Katz, et al. |
| 2 | Enumeration of rational curves via torus action, hep-th/9405035 – Kontsevich - 1994 |
| 1 | Enumerative Geometry of Curves on – Katz |
| 1 | Extraits du S'eminaire Bourbaki – Grothendieck - 1962 |
