| 21. | The moduli space must not only be K�hler, but also the K�hler form must lift to integral cohomology.
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| 22. | Other examples of varieties that are shown to be unirational are many cases of the moduli space of curves.
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| 23. | The fact that the number of such flow lines is finite follows from the compactness of the moduli space.
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| 24. | In an \ mathcal { N } = 2 4D SUSY theory the moduli space of the vector multiplets.
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| 25. | When M is equal to N, however, the moduli space receives quantum corrections from a single instanton.
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| 26. | Such configurations make the moduli space very singular so a fundamental class cannot be defined in the usual way.
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| 27. | There were also many new applications : a typical one is calculating the dimensions of the moduli spaces of instantons.
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| 28. | The cone over the Petersen graph is naturally identified with the moduli space of five-pointed rational tropical curves.
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| 29. | Second, Hodge theory gives information about the moduli space of smooth complex projective varieties with a given topological type.
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| 30. | For Calabi� Yau threefolds, the Donaldson� Thomas invariants can be formulated as weighted Euler characteristic on the moduli space.
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