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1 Brief History of Classical Mirror Symmetry |
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1 | (26) |
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1.1 Grand Unified Theory and Superstring Theory |
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1 | (4) |
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1.2 Compactification of Heterotic String Theory |
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5 | (7) |
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1.3 Discovery of Mirror Symmetry of N = 2 Superconformal Field Theory |
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12 | (8) |
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1.4 First Striking Prediction of Mirror Symmetry |
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20 | (7) |
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26 | (1) |
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2 Basics of Geometry of Complex Manifolds |
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27 | (28) |
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27 | (3) |
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2.2 Vector Bundles of Complex Manifold |
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30 | (6) |
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2.2.1 Definition of Holomorphic Vector Bundles, Covariant Derivatives, Connections and Curvatures |
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30 | (6) |
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36 | (8) |
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2.3.1 Calculus of Holomorphic Vector Bundles and Chern Classes |
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40 | (4) |
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2.4 Kahler Manifolds and Projective Spaces |
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44 | (5) |
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2.4.1 Definition of Kahler Manifolds |
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44 | (3) |
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2.4.2 Dolbeault Cohomology of Kahler Manifolds |
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47 | (2) |
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2.5 Complex Projective Space as an Example of Compact Kahler Manifold |
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49 | (6) |
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53 | (2) |
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3 Topological Sigma Models |
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55 | (28) |
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3.1 N = 2 Supersymmetric Sigma Model |
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55 | (2) |
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3.2 Topological Sigma Model (A-Model) |
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57 | (18) |
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3.2.1 Lagrangian and Saddle Point Approximation |
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57 | (6) |
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3.2.2 Observable Satisfying {Q, O} = 0 and Topological Selection Rule |
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63 | (2) |
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3.2.3 Geometrical Interpretation of Degree d Correlation Function |
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65 | (2) |
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3.2.4 Degree d Correlation Function of Degree 5 Hypersurface in CP4 |
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67 | (8) |
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3.3 Topological Sigma Model (B-Model) |
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75 | (8) |
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75 | (3) |
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3.3.2 Observable that Satisfies {Q, O} =0 and Topological Selection Rule |
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78 | (1) |
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3.3.3 Correlation Function |
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79 | (2) |
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81 | (2) |
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4 Details of B-Model Computation |
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83 | (26) |
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83 | (7) |
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4.1.1 Outline of Toric Geometry |
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83 | (1) |
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4.1.2 An Example: Complex Projective Space |
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84 | (6) |
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4.2 Formulation of Mirror Symmetry by Toric Geometry |
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90 | (9) |
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4.2.1 An Example: Quintic Hypersurface in CP4 |
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90 | (4) |
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4.2.2 Blow-Up (Resolution of Singularity) and Hodge Number |
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94 | (5) |
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4.3 Details of B-Model Computation |
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99 | (10) |
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4.3.1 Derivation of Differential Equations Satisfied by Period Integrals |
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99 | (4) |
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4.3.2 Derivation of B-Model Yukawa Coupling |
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103 | (2) |
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4.3.3 Instanton Expansion of A-Model Yukawa Couplings |
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105 | (3) |
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108 | (1) |
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5 Reconstruction of Mirror Symmetry Hypothesis from a Geometrical Point of View |
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109 | |
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5.1 Simple Compactification of Holomorphic Maps from CP1 to CP4 |
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109 | (7) |
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5.1.1 A-Model Correlation Functions as Intersection Numbers |
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109 | (3) |
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5.1.2 Evaluation of Yukawa Coupling of Quintic Hypersurface in CP4 by Using Simple Compactification of the Moduli Space |
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112 | (4) |
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5.2 Toric Compactification of the Moduli Space of Degree d Quasi Maps with Two Marked Points |
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116 | (4) |
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5.3 Construction of Two Point Intersection Numbers on Mp0,2(CP4, d) |
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120 | (2) |
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5.4 Fixed Point Theorem and Computation of w (Oha Ohb)0,d |
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122 | (8) |
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5.4.1 Fixed Point Theorem |
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122 | (3) |
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5.4.2 Computation of w(Oha Ohb)0,d |
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125 | (5) |
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5.5 Reconstruction of Mirror Symmetry Computation |
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130 | |
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140 | |
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