Verfügbarkeit: Gauss sums, Kloosterman sums, and monodromy groups

Gauss sums, Kloosterman sums, and monodromy groups:

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Bibliographische Detailangaben
1. Verfasser:	Katz, Nicholas M. 1943- (VerfasserIn)
Format:	Buch
Sprache:	English
Veröffentlicht:	Princeton, NJ Princeton Univ. Press 1988
Schriftenreihe:	Annals of mathematics studies 116
Schlagworte:	Gauss, sommes de Groupes de monodromie Homologie Kloosterman, sommes de Gaussian sums Homology theory Kloosterman sums Monodromy groups Kloosterman-Summe Monodromiegruppe Gauß-Summe
Online-Zugang:	Inhaltsverzeichnis
Beschreibung:	VIII, 246 S.
ISBN:	0691084327 0691084335

Internformat

MARC


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Datensatz im Suchindex

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adam_text	Contents Introduction 1 Chapter 1. Breaks and Swan Conductors 12 1.0 The basic setting 12 1.1 1.10 Definitions and basic properties of breaks, break decompositions, and Swan conductors 12 1.11 1.17 Representation theoretic consequences of particular arrays of breaks 17 1.18 1.20 Detailed analysis when Swan =1 23 Chapter 2. Curves and Their Cohomology 26 2.0 Generalities 26 2.1 Cohomology of wild sheaves 28 2.2 Canonical calculations of cohomology 28 2.3 The Euler Poincare and Lefschetz trace formulas 31 Chapter 3. Equidistribution in Equal Characteristic 36 3.0 3.5 The basic setting 36 3.6 The equidistribution theorem 38 3.7 Remark on the integration of sufficiently smooth functions 42 Chapter 4. Gauss Sums and Kloosterman Sums: Kloosterman Sheaves 46 4.0 Kloosterman sums as inverse Fourier transforms of mono¬ mials in Gauss sums 46 4.1 The existence theorem for Kloosterman sheaves 48 4.2 Signs of pairings 54 4.3 The existence theorem for n — 1, via the sheaves C,p and Cx 59 vi Contents Chapter 5. Convolution of Sheaves on Gm 62 5.0 The basic setting, and a lemma 62 5.1 Statement of the convolution theorem 63 5.2 Proof of the convolution theorem and variations 65 5.3 Convolution and duality: Signs 77 5.4 Multiple convolution 79 5.5 First applications to Kloosterman sheaves 80 5.6 Direct images of Kloosterman sheaves, via Hasse Davenport 84 Chapter 6. Local Convolution 87 6.0 Formulation of the problem 87 6.1 Consequences of a solution 87 6.2 6.4 Preparations 88 6.5 A theorem on vanishing cycles 90 6.6 Construction of local convolution 95 Chapter 7. Local Monodromy at Zero of a Convolution: Detailed Study 96 7.0 General review of local monodromy 96 7.1 Application to a product formula for a convolution of pure sheaves 100 7.2 Application to sheaves with Swanoo = 1 104 7.3 Application to Kloosterman sheaves 105 7.4 Some special cases 107 7.5 Appendix: The product formula in the general case (d apres O. Gabber) 109 7.6 Appendix: An open problem concerning breaks of a convolution 117 Chapter 8. Complements on Convolution 120 8.0 A cancellation theorem for convolution 120 8.1 Two variants of the cancellation theorem 127 8.2 Interlude: Naive Fourier transform 130 8.3 Basic examples of Fourier sheaves 134 8.4 Irreducible Fourier sheaves 135 8.5 Numerology of Fourier transform 136 8.6 Convolution with £^ as Fourier transform 142 I Contents vii 8.7 Ubiquity of Kloosterman sheaves 146 8.8 The structure over Fq: Canonical descents of Kloosterman sheaves 148 I 8.9 Embedding in a compatible system 152 Chapter 9. Equidistribution in (S1)1 of r tuples of Angles of Gauss Sums 155 i 9.0 Motivation: Davenport s theorem on consecutive I quadratic residues 155 • 9.1 9.2 Formulation of the problem 157 9.3 9.5 The theorem, a reformulation, and a reduction 158 9.7 The end of the proof 165 , 9.8 Remark concerning the proof 166 Chapter 10. Local Monodromy at oo of Kloosterman Sheaves 168 10.0 Review of some independence of / results 168 10.1 Independence of / and x s as Poo representation 168 10.2 Independence of / and x s of oo breaks of tensor products 169 10.3 10.4 Breaks and Swans of tensor products 169 Chapter 11. Global Monodromy of Kloosterman Sheaves 176 11.0 Formulation of the theorem 176 11.1 Statement of the main theorem 178 11.2 Remarks and comments 179 11.3 A corollary 179 11.4 First application to equidistribution 180 11.5 Axiomatics of the proof; classification theorems 180 11.6 The classification theorem 184 11.7 An axiomatic classification theorem 185 11.8 G2 Theorem 186 11.9 Density Theorem 186 11.10 Proof of the classification theorem (11.6) 186 11.11 Proof of the G2 Theorem 200 viii Contents Chapter 12. Integral Monodromy of Kloosterman Sheaves (d apres O. Gabber) 210 12.0 Formulation of the theorem 210 12.1 The theorem 211 12.2 A more precise version 212 12.3 Reduction to a universal situation 212 12.4 Generation by unipotent elements 217 12.5 Analysis of the special case p = 2, n odd ^ 7 227 12.6 Analysis of the special case p = 2, n = 7 229 Chapter 13. Equidistibution of Angles of Kloosterman Sums 234 13.0 13.4 Uniform description of the space of conjugacy classes and its Haar measure 234 13.5 Formulation of the theorem 238 13.6 Example: the simplest case 240 References 243
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isbn	0691084327 0691084335
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physical	VIII, 246 S.
publishDate	1988
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series	Annals of mathematics studies
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spelling	Katz, Nicholas M. 1943- Verfasser (DE-588)141265558 aut Gauss sums, Kloosterman sums, and monodromy groups by Nicholas M. Katz Princeton, NJ Princeton Univ. Press 1988 VIII, 246 S. txt rdacontent n rdamedia nc rdacarrier Annals of mathematics studies 116 Gauss, sommes de ram Groupes de monodromie ram Homologie ram Kloosterman, sommes de ram Gaussian sums Homology theory Kloosterman sums Monodromy groups Kloosterman-Summe (DE-588)4309220-2 gnd rswk-swf Monodromiegruppe (DE-588)4194644-3 gnd rswk-swf Gauß-Summe (DE-588)4156109-0 gnd rswk-swf Kloosterman-Summe (DE-588)4309220-2 s Monodromiegruppe (DE-588)4194644-3 s DE-604 Gauß-Summe (DE-588)4156109-0 s Annals of mathematics studies 116 (DE-604)BV000000991 116 HBZ Datenaustausch application/pdf http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=001606375&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA Inhaltsverzeichnis
spellingShingle	Katz, Nicholas M. 1943- Gauss sums, Kloosterman sums, and monodromy groups Annals of mathematics studies Gauss, sommes de ram Groupes de monodromie ram Homologie ram Kloosterman, sommes de ram Gaussian sums Homology theory Kloosterman sums Monodromy groups Kloosterman-Summe (DE-588)4309220-2 gnd Monodromiegruppe (DE-588)4194644-3 gnd Gauß-Summe (DE-588)4156109-0 gnd
subject_GND	(DE-588)4309220-2 (DE-588)4194644-3 (DE-588)4156109-0
title	Gauss sums, Kloosterman sums, and monodromy groups
title_auth	Gauss sums, Kloosterman sums, and monodromy groups
title_exact_search	Gauss sums, Kloosterman sums, and monodromy groups
title_full	Gauss sums, Kloosterman sums, and monodromy groups by Nicholas M. Katz
title_fullStr	Gauss sums, Kloosterman sums, and monodromy groups by Nicholas M. Katz
title_full_unstemmed	Gauss sums, Kloosterman sums, and monodromy groups by Nicholas M. Katz
title_short	Gauss sums, Kloosterman sums, and monodromy groups
title_sort	gauss sums kloosterman sums and monodromy groups
topic	Gauss, sommes de ram Groupes de monodromie ram Homologie ram Kloosterman, sommes de ram Gaussian sums Homology theory Kloosterman sums Monodromy groups Kloosterman-Summe (DE-588)4309220-2 gnd Monodromiegruppe (DE-588)4194644-3 gnd Gauß-Summe (DE-588)4156109-0 gnd
topic_facet	Gauss, sommes de Groupes de monodromie Homologie Kloosterman, sommes de Gaussian sums Homology theory Kloosterman sums Monodromy groups Kloosterman-Summe Monodromiegruppe Gauß-Summe
url	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=001606375&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
volume_link	(DE-604)BV000000991
work_keys_str_mv	AT katznicholasm gausssumskloostermansumsandmonodromygroups

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