简介
In 1970, Phillip Griffiths envisioned that points at infinity could be added to the classifying space D of polarized Hodge structures. In this book, Kazuya Kato and Sampei Usui realize this dream by creating a logarithmic Hodge theory. They use the logarithmic structures begun by Fontaine-Illusie to revive nilpotent orbits as a logarithmic Hodge structure. The book focuses on two principal topics. First, Kato and Usui construct the fine moduli space of polarized logarithmic Hodge structures with additional structures. Even for a Hermitian symmetric domain D, the present theory is a refinement of the toroidal compactifications by Mumford et al. For general D, fine moduli spaces may have slits caused by Griffiths transversality at the boundary and be no longer locally compact. Second, Kato and Usui construct eight enlargements of D and describe their relations by a fundamental diagram, where four of these enlargements live in the Hodge theoretic area and the other four live in the algebra-group theoretic area. These two areas are connected by a continuous map given by the SL(2)-orbit theorem of Cattani-Kaplan-Schmid. This diagram is used for the construction in the first topic.
目录
Introduction p. 1
Chapter 0 Overview p. 7
0.1 Hodge Theory p. 7
0.2 Logarithmic Hodge Theory p. 11
0.3 Griffiths Domains and Moduli of PH p. 24
0.4 Toroidal Partial Compactifications of [Gamma]/D and Moduli of PLH p. 30
0.5 Fundamental Diagram and Other Enlargements of D p. 43
0.6 Plan of This Book p. 66
0.7 Notation and Convention p. 67
Chapter 1 Spaces of Nilpotent Orbits and Spaces of Nilpotent i-Orbits p. 70
1.1 Hodge Structures and Polarized Hodge Structures p. 70
1.2 Classifying Spaces of Hodge Structures p. 71
1.3 Extended Classifying Spaces p. 72
Chapter 2 Logarithmic Hodge Structures p. 75
2.1 Logarithmic Structures p. 75
2.2 Ringed Spaces (X[superscript log], [characters not reproducible]) p. 81
2.3 Local Systems on X[superscript log] p. 88
2.4 Polarized Logarithmic Hodge Structures p. 94
2.5 Nilpotent Orbits and Period Maps p. 97
2.6 Logarithmic Mixed Hodge Structures p. 105
Chapter 3 Strong Topology and Logarithmic Manifolds p. 107
3.1 Strong Topology p. 107
3.2 Generalizations of Analytic Spaces p. 115
3.3 Sets E[subscript sigma] and [characters not reproducible] p. 120
3.4 Spaces E[subscript sigma], [Gamma]/D[subscript Sigma], [characters not reproducible], and [characters not reproducible] p. 125
3.5 Infinitesimal Calculus and Logarithmic Manifolds p. 127
3.6 Logarithmic Modifications p. 133
Chapter 4 Main Results p. 146
4.1 Theorem A: The Spaces E[subscript sigma], [Gamma]/D[subscript Sigma], and [characters not reproducible] p. 146
4.2 Theorem B: The Functor [characters not reproducible] p. 147
4.3 Extensions of Period Maps p. 148
4.4 Infinitesimal Period Maps p. 153
Chapter 5 Fundamental Diagram p. 157
5.1 Borel-Serre Spaces (Review) p. 158
5.2 Spaces of SL(2)-Orbits (Review) p. 165
5.3 Spaces of Valuative Nilpotent Orbits p. 170
5.4 Valuative Nilpotent i-Orbits and SL(2)-Orbits p. 173
Chapter 6 The Map [psi]: [characters not reproducible] to D[subscript SL] (2) p. 175
6.1 Review of [CKS] and Some Related Results p. 175
6.2 Proof of Theorem 5.4.2 p. 186
6.3 Proof of Theorem 5.4.3 (i) p. 190
6.4 Proofs of Theorem 5.4.3 (ii) and Theorem 5.4.4 p. 195
Chapter 7 Proof of Theorem A p. 205
7.1 Proof of Theorem A (i) p. 205
7.2 Action of [sigma subscript C] on E[subscript sigma] p. 209
7.3 Proof of Theorem A for [Gamma]([sigma])[superscript gp]/D[subscript sigma] p. 215
7.4 Proof of Theorem A for [Gamma]/D[subscript Sigma] p. 220
Chapter 8 Proof of Theorem B p. 226
8.1 Logarithmic Local Systems p. 226
8.2 Proof of Theorem B p. 229
8.3 Relationship among Categories of Generalized Analytic Spaces p. 235
8.4 Proof of Theorem 0.5.29 p. 241
Chapter 9 b-Spaces p. 244
9.1 Definitions and Main Properties p. 244
9.2 Proofs of Theorem 9.1.4 for [characters not reproducible], and [characters not reproducible] p. 246
9.3 Proof of Theorem 9.1.4 for [Gamma]/[characters not reproducible] p. 248
9.4 Extended Period Maps p. 249
Chapter 10 Local Structures of D[subscript SL(2)] and [Gamma]/[characters not reproducible] p. 251
10.1 Local Structures of D[subscript SL(2)] p. 251
10.2 A Special Open Neighborhood U(p) p. 255
10.3 Proof of Theorem 10.1.3 p. 263
10.4 Local Structures of D[subscript SL(2). less than or equal 1] and [characters not reproducible] p. 269
Chapter 11 Moduli of PLH with Coefficients p. 271
11.1 Space [characters not reproducible] p. 271
11.2 PLH with Coefficients p. 274
11.3 Moduli p. 275
Chapter 12 Examples and Problems p. 277
12.1 Siegel Upper Half Spaces p. 277
12.2 Case G[subscript R] [characters not reproducible] O(1, n - 1, R) p. 281
12.3 Example of Weight 3 (A) p. 290
12.4 Example of Weight 3 (B) p. 295
12.5 Relationship with [U2] p. 299
12.6 Complete Fans p. 301
12.7 Problems p. 304
Appendix p. 307
A1 Positive Direction of Local Monodromy p. 307
A2 Proper Base Change Theorem for Topological Spaces p. 310
References p. 315
List of Symbols p. 321
Index p. 331
Chapter 0 Overview p. 7
0.1 Hodge Theory p. 7
0.2 Logarithmic Hodge Theory p. 11
0.3 Griffiths Domains and Moduli of PH p. 24
0.4 Toroidal Partial Compactifications of [Gamma]/D and Moduli of PLH p. 30
0.5 Fundamental Diagram and Other Enlargements of D p. 43
0.6 Plan of This Book p. 66
0.7 Notation and Convention p. 67
Chapter 1 Spaces of Nilpotent Orbits and Spaces of Nilpotent i-Orbits p. 70
1.1 Hodge Structures and Polarized Hodge Structures p. 70
1.2 Classifying Spaces of Hodge Structures p. 71
1.3 Extended Classifying Spaces p. 72
Chapter 2 Logarithmic Hodge Structures p. 75
2.1 Logarithmic Structures p. 75
2.2 Ringed Spaces (X[superscript log], [characters not reproducible]) p. 81
2.3 Local Systems on X[superscript log] p. 88
2.4 Polarized Logarithmic Hodge Structures p. 94
2.5 Nilpotent Orbits and Period Maps p. 97
2.6 Logarithmic Mixed Hodge Structures p. 105
Chapter 3 Strong Topology and Logarithmic Manifolds p. 107
3.1 Strong Topology p. 107
3.2 Generalizations of Analytic Spaces p. 115
3.3 Sets E[subscript sigma] and [characters not reproducible] p. 120
3.4 Spaces E[subscript sigma], [Gamma]/D[subscript Sigma], [characters not reproducible], and [characters not reproducible] p. 125
3.5 Infinitesimal Calculus and Logarithmic Manifolds p. 127
3.6 Logarithmic Modifications p. 133
Chapter 4 Main Results p. 146
4.1 Theorem A: The Spaces E[subscript sigma], [Gamma]/D[subscript Sigma], and [characters not reproducible] p. 146
4.2 Theorem B: The Functor [characters not reproducible] p. 147
4.3 Extensions of Period Maps p. 148
4.4 Infinitesimal Period Maps p. 153
Chapter 5 Fundamental Diagram p. 157
5.1 Borel-Serre Spaces (Review) p. 158
5.2 Spaces of SL(2)-Orbits (Review) p. 165
5.3 Spaces of Valuative Nilpotent Orbits p. 170
5.4 Valuative Nilpotent i-Orbits and SL(2)-Orbits p. 173
Chapter 6 The Map [psi]: [characters not reproducible] to D[subscript SL] (2) p. 175
6.1 Review of [CKS] and Some Related Results p. 175
6.2 Proof of Theorem 5.4.2 p. 186
6.3 Proof of Theorem 5.4.3 (i) p. 190
6.4 Proofs of Theorem 5.4.3 (ii) and Theorem 5.4.4 p. 195
Chapter 7 Proof of Theorem A p. 205
7.1 Proof of Theorem A (i) p. 205
7.2 Action of [sigma subscript C] on E[subscript sigma] p. 209
7.3 Proof of Theorem A for [Gamma]([sigma])[superscript gp]/D[subscript sigma] p. 215
7.4 Proof of Theorem A for [Gamma]/D[subscript Sigma] p. 220
Chapter 8 Proof of Theorem B p. 226
8.1 Logarithmic Local Systems p. 226
8.2 Proof of Theorem B p. 229
8.3 Relationship among Categories of Generalized Analytic Spaces p. 235
8.4 Proof of Theorem 0.5.29 p. 241
Chapter 9 b-Spaces p. 244
9.1 Definitions and Main Properties p. 244
9.2 Proofs of Theorem 9.1.4 for [characters not reproducible], and [characters not reproducible] p. 246
9.3 Proof of Theorem 9.1.4 for [Gamma]/[characters not reproducible] p. 248
9.4 Extended Period Maps p. 249
Chapter 10 Local Structures of D[subscript SL(2)] and [Gamma]/[characters not reproducible] p. 251
10.1 Local Structures of D[subscript SL(2)] p. 251
10.2 A Special Open Neighborhood U(p) p. 255
10.3 Proof of Theorem 10.1.3 p. 263
10.4 Local Structures of D[subscript SL(2). less than or equal 1] and [characters not reproducible] p. 269
Chapter 11 Moduli of PLH with Coefficients p. 271
11.1 Space [characters not reproducible] p. 271
11.2 PLH with Coefficients p. 274
11.3 Moduli p. 275
Chapter 12 Examples and Problems p. 277
12.1 Siegel Upper Half Spaces p. 277
12.2 Case G[subscript R] [characters not reproducible] O(1, n - 1, R) p. 281
12.3 Example of Weight 3 (A) p. 290
12.4 Example of Weight 3 (B) p. 295
12.5 Relationship with [U2] p. 299
12.6 Complete Fans p. 301
12.7 Problems p. 304
Appendix p. 307
A1 Positive Direction of Local Monodromy p. 307
A2 Proper Base Change Theorem for Topological Spaces p. 310
References p. 315
List of Symbols p. 321
Index p. 331
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