Mirror Principle Iv
نویسندگان
چکیده
This is a continuation of Mirror Principle III [14].
منابع مشابه
ar X iv : m at h / 99 12 03 8 v 1 [ m at h . A G ] 6 D ec 1 99 9 Mirror Principle III
We generalize the theorems in Mirror Principle I and II to the case of general projective manifolds without the convexity assumption. We also apply the results to balloon manifolds, and generalize to higher genus.
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Mirror principle is a general method developed in [LLY1]-[LLY4] to compute characteristic classes and characteristic numbers on moduli spaces of stable maps in terms of hypergeometric type series. The counting of the numbers of curves in Calabi-Yau manifolds from mirror symmetry corresponds to the computation of Euler numbers. This principle computes quite general Hirzebruch multiplicative clas...
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We generalize our theorems in Mirror Principle I to a class of balloon manifolds. Many of the results are proved for convex projective manifolds. In a subsequent paper, Mirror Principle III, we will extend the results to projective manifolds without the convexity assumption. 1 Department of Mathematics, Brandeis University, Waltham, MA 02154. 2 Department of Mathematics, Stanford University, St...
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