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9784431539124

Theory of Hypergeometric Functions

by ;
  • ISBN13:

    9784431539124

  • ISBN10:

    4431539123

  • Format: Hardcover
  • Copyright: 2011-05-16
  • Publisher: Springer Nature
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Summary

This book presents a geometric theory of complex analytic integrals representing hypergeometric functions of several variables. Starting from an integrand which is a product of powers of polynomials, integrals are explained, in an open affine space, as a pair of twisted de Rham cohomology and its dual over the coefficients of local system. It is shown that hypergeometric integrals generally satisfy holonomic system of linear differential equations with respect to the coefficients of polynomials and also satisfy holonomic system of linear difference equations with respect to the exponents. These are basically deduced from Grothendieck-Deligne's rational de Rham cohomology on the one hand, and by multidimensional extension of Birkhoff's classical theory on analytic difference equations on the other.

Table of Contents

Introduction: the Euler-Gauss Hypergeometric Functionp. 1
¿-Functionp. 2
Infinite-Product Representation Due to Eulerp. 2
¿-Function as Meromorphic Functionp. 3
Connection Formulap. 4
Power Series and Higher Logarithmic Expansionp. 4
Hypergeometric Seriesp. 4
Gauss' Differential Equationp. 5
First-Order Fuchsian Equationp. 6
Logarithmic Connectionp. 6
Higher Logarithmic Expansionp. 7
D-Modulep. 10
Integral Representation Due to Euler and Riemannp. 11
Kummer's Methodp. 11
Gauss' Contiguous Relations and Continued Fraction Expansionp. 12
Gauss' Contiguous Relationp. 12
Continued Fraction Expansionp. 13
Convergencep. 15
The Mellin-Barnes Integralp. 16
Summation over a Latticep. 16
Barnes' Integral Representationp. 16
Mellin's Differential Equationp. 18
Plan from Chapter 2p. 19
Representation of Complex Integrals and Twisted de Rham Cohomologiesp. 21
Formulation of the Problem and Intuitive Explanation of the Twisted de Rham Theoryp. 21
Concept of Twistp. 21
Intuitive Explanationp. 22
One-Dimensional Casep. 23
Two-Dimensional Casep. 24
Higher-Dimensional Generalizationp. 25
Twisted Homology Groupp. 26
Locally Finite Twisted Homology Groupp. 28
Review of the de Rham Theory and the Twisted de Rham Theoryp. 29
Preliminary from Homological Algebrap. 29
Currentp. 31
Current with Compact Supportp. 33
Sheaf Cohomologyp. 33
The Case of Compact Supportp. 35
De Rham's Theoremp. 35
Dualityp. 36
Integration over a Simplexp. 36
Twisted Chainp. 38
Twisted Version of § 2.2.4p. 39
Poincaré Dualityp. 40
Reformulationp. 41
Comparison of Cohomologiesp. 42
Computation of the Euler Characteristicp. 44
Construction of Twisted Cycles (1): One-Dimensional Casep. 48
Twisted Cycle Around One Pointp. 48
Construction of Twisted Cyclesp. 50
Intersection Number (i)p. 52
Comparison Theoremp. 54
Algebraic de Rham Complexp. 54
Cech Cohomologyp. 55
Hypercohomologyp. 56
Spectral Sequencep. 57
Algebraic de Rham Cohomologyp. 58
Analytic de Rham Cohomologyp. 58
Comparison Theoremp. 59
Reformulationp. 60
de Rham-Saito Lemma and Representation of Logarithmic Differential Formsp. 60
Logarithmic Differential Formsp. 60
de Rham-Saito Lemmap. 63
Representation of Logarithmic Differential Forms (i)p. 69
Vanishing of Twisted Cohomology for Homogeneous Casep. 74
Basic Operatorsp. 74
Homotopy Formulap. 76
Eigenspace Decompositionp. 77
Vanishing Theorem (i)p. 78
Filtration of Logarithmic Complexp. 79
Filtrationp. 79
Comparison with Homogeneous Casep. 80
Isomorphismp. 81
Vanishing Theorem of the Twisted Rational de Rham Cohomologyp. 82
Vanishing of Logarithmic de Rham Cohomologyp. 83
Vanishing of Algebraic de Rham Cohomologyp. 83
Two-Dimensional Casep. 85
Examplep. 86
Arrangement of Hyperplanes in General Positionp. 88
Vanishing Theorem (ii)p. 88
Representation of Logarithmic Differential Forms (ii)p. 89
Reduction of Polesp. 93
Comparison Theoremp. 96
Filtrationp. 96
Basis of Cohomologyp. 98
Arrangement of Hyperplanes and Hypergeometric Functions over Grassmanniansp. 103
Classical Hypergeometric Series and Their Generalizations, in Particular, Hypergeometric Series of Type (n + 1, m + 1)p. 103
Definitionp. 103
Simple Examplesp. 104
Hypergeometric Series of Type (n + 1, m + 1)p. 105
Appell-Lauricella Hypergeometric Functions (i)p. 106
Appell-Lauricella Hypergeometric Functions (ii)p. 106
Restriction to a Sublatticep. 106
Examplesp. 107
Appell-Lauricella Hypergeometric Functions (iii)p. 107
Horn's Hypergeometric Functionsp. 108
Construction of Twisted Cycles (2): For an Arrangement of Hyperplanes in General Positiionp. 108
Twisted Homology Groupp. 108
Bounded Chambersp. 109
Basis of Locally Finite Homologyp. 109
Construction of Twisted Cyclesp. 112
Regularization of Integralsp. 115
Kummer's Method for Integral Representations and Its Modernization via the Twisted de Rham Theory: Integral Representations of Hypergeometric Series of Type (n + 1, m +1)p. 117
Kummer's Methodp. 117
One-Dimensional Casep. 117
Higher-Dimensional Casep. 118
Elementary Integral Representationsp. 119
Hypergeometric Function of Type (3,6)p. 121
Hypergeometric Functions of Type (n + 1, m + 1)p. 123
Horn's Casesp. 124
System of Hypergeometric Differential Equations E(n + 1, m + 1; ¿)p. 126
Hypergeometric Integral of Type (n + 1, m + 1; ¿)p. 126
Differential Equation E(n + 1, m + 1; ¿)p. 128
Equivalent Systemp. 133
Integral Solutions of E(n + 1, m + 1; ¿) and Wronskianp. 135
Hypergeometric Integrals as a Basisp. 135
Gauss' Equation E'(2, 4; ¿')p. 137
Appell-Lauricella Hypergeometric Differential Equation E'(2, m + 1; ¿')p. 138
Equation E'(3.6; ¿')p. 139
Equation E'(4, 8; ¿')p. 140
General Casesp. 142
Wronskianp. 144
Varchenko's Formulap. 145
Intersection Number (ii)p. 147
Twisted Riemann's Period Relations and Quadratic Relations of Hypergeometric Functionsp. 150
Determination of the Rank of E(n + 1, m + 1; ¿)p. 153
Equation E'(n + 1, m + 1; ¿')p. 153
Equation E'(2,4; ¿')p. 154
Equation E'(2, m + 1; ¿')p. 155
Equation E'(3, 6; ¿')p. 157
Equation E'(n + 1, m + 1; ¿')p. 160
Duality of E(n + 1, m + 1; ¿)p. 165
Duality of Equationsp. 165
Duality of Grassmanniansp. 167
Duality of Hypergeometric Functionsp. 169
Duality of Integral Representationsp. 169
Examplep. 170
Logarithmic Gauss-Manin Connection Associated to an Arrangement of Hyperplanes in General Positionp. 171
Review of Notationp. 171
Variational Formulap. 173
Partial Fraction Expansionp. 174
Reformulationp. 174
Examplep. 177
Logarithmic Gauss-Manin Connectionp. 178
Holonomic Difference Equations and Asymptotic Expansionp. 183
Existence Theorem Due to G.D. Birkhoff and Infinite- Product Representation of Matricesp. 184
Normal Form of Matrix-Valued Functionp. 184
Asymptotic Form of Solutionsp. 187
Existence Theorem (i)p. 188
Infinite-Product Representation of Matricesp. 189
Gauss' Decompositionp. 190
Regularization of the Productp. 192
Convergence of the First Columnp. 194
Asymptotic Estimate of Infinite Productp. 194
Convergence of Lower Triangular Matricesp. 196
Asymptotic Estimate of Lower Triangular Matricesp. 197
Difference Equation Satisfied by Upper Triangular Matricesp. 199
Resolution of Difference Equationsp. 200
Completion of the Proofp. 202
Holonomic Difference Equations in Several Variables and Asymptotic Expansionp. 204
Holonomic Difference Equations of First Orderp. 204
Formal Asymptotic Expansionp. 205
Normal Form of Asymptotic Expansionp. 207
Existence Theorem (ii)p. 209
Connection Problemp. 210
Examplep. 211
Remark on 1-Cocylesp. 213
Gauss' Contiguous Relationsp. 213
Convergencep. 215
Continued Fraction Expansionp. 216
Saddle Point Method and Asymptotic Expansionp. 216
Contracting (Expanding) Twisted Cycles and Asymptotic Expansionp. 221
Twisted Cohomologyp. 221
Saddle Point Method for Multi-Dimensional Casep. 223
Complete Kähler Metricp. 224
Gradient Vector Fieldp. 226
Critical Pointsp. 228
Vanishing Theorem (iii)p. 228
Application of the Morse Theoryp. 231
n-Dimensional Lagrangian Cyclesp. 232
n-Dimensional Twisted Cyclesp. 239
Geometric Meaning of Asymptotic Expansionp. 240
Difference Equations Satisfied by the Hypergeometric Functions of Type (n + l, m +1; ¿)p. 243
Bounded Chambersp. 243
Derivation of Difference Equationsp. 245
Asymptotic Expansion with a Fixed Directionp. 250
Examplep. 251
Non-Degeneracy of Period Matrixp. 251
Connection Problem of System of Difference Equationsp. 254
Formulationp. 254
The Case of Appell-Lauricella Hypergeometric Functionsp. 256
Mellin's Generalized Hypergeometric Functionsp. 261
Definitionp. 261
Definitionp. 261
Kummer's Methodp. 262
Toric Multinomial Theoremp. 264
Elementary Integral Representationsp. 266
Differential Equations of Mellin Typep. 268
b-Functionsp. 269
Action of Algebraic Torusp. 271
Vector Fields of Torus Actionp. 272
Lattice Defined by the Charactersp. 272
G-G-Z Equationp. 274
Convergencep. 276
The Selberg Integral and Hypergeometric Function of BC Typep. 279
Selberg's Integralp. 279
Generalization to Correlation Functionsp. 280
Monodromy Representation of Hypergeometric Functions of Type (2, m + 1; ¿)p. 283
Isotopic Deformation and Monodromyp. 283
KZ Equation (Toshitake Kohno)p. 287
Knizhnik-Zamolodchikov Equationp. 288
Review of Conformal Field Theoryp. 289
Connection Matrices of KZ Equationp. 294
Iwahori-Hecke Algebra and Quasi-Hopf Algebrasp. 296
Kontsevich Integral and Its Applicationp. 299
Integral Representation of Solutions of the KZ Equationp. 303
Referencesp. 307
Indexp. 315
Table of Contents provided by Ingram. All Rights Reserved.

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