This research paper develops a new method (I-functions) for understanding mirror symmetry in complex spaces called non-split toric bundles.
Author: Yuki Koto Table of Links Abstract and Intro Genus-zero Gromov-Witten Theory Toric Bundles Lagrangian cones of Toric bundles Mirror theorem for a product of projectives bundles Mirror Theorem for Toric Bundles Appendix A. Equivariant Fourier Transformation and References 6. Mirror theorem for toric bundles In this section, we will prove the mirror theorem for toric bundles. Throughout this section, we fix the following data: for any vector bundle V .
Equivariant Fourier Transformation and References Abstract and Intro Abstract and Intro Genus-zero Gromov-Witten Theory Genus-zero Gromov-Witten Theory Toric Bundles Toric Bundles Lagrangian cones of Toric bundles Lagrangian cones of Toric bundles Mirror theorem for a product of projectives bundles Mirror theorem for a product of projectives bundles Mirror Theorem for Toric Bundles Mirror Theorem for Toric Bundles Appendix A. Equivariant Fourier Transformation and References Appendix A.
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A Mirror Theorem for Non-split Toric Bundles: Lagrangian Cones of Toric BundlesThis research paper develops a new method (I-functions) for understanding mirror symmetry in complex spaces called non-split toric bundles.
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A Mirror Theorem for Non-split Toric Bundles: Mirror Theorem for a Product of Projectives BundleThis research paper develops a new method (I-functions) for understanding mirror symmetry in complex spaces called non-split toric bundles.
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A Mirror Theorem for Non-split Toric Bundles: Genus-zero Gromov-Witten TheoryThis research paper develops a new method (I-functions) for understanding mirror symmetry in complex spaces called non-split toric bundles.
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