Verfügbarkeit: Periods and Nori motives

Periods and Nori motives:

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Bibliographische Detailangaben
Hauptverfasser:	Huber, Annette 1967- (VerfasserIn), Müller-Stach, Stefan 1962- (VerfasserIn)
Weitere Verfasser:	Friedrich, Benjamin 1980- (MitwirkendeR), Wangenheim, Jonas von (MitwirkendeR)
Format:	Buch
Sprache:	English
Veröffentlicht:	Cham, Switzerland Springer [2017]
Schriftenreihe:	Ergebnisse der Mathematik und ihrer Grenzgebiete. 3. Folge volume 65
Schlagworte:	Kohomologie Zahlentheorie Periode Motiv > Mathematik
Online-Zugang:	Inhaltsverzeichnis
Beschreibung:	xxiii, 372 Seiten
ISBN:	9783319509259 9783319845241

Internformat

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Datensatz im Suchindex

_version_	1804177397721858048
adam_text	Contents Part I Background Material 1 General Set-Up................................................... 3 1.1 Varieties .................................................... 3 1.1.1 Linearising the Category of Varieties.................. 3 1.1.2 Divisors with Normal Crossings......................... 4 1.2 Complex Analytic Spaces ...................................... 5 1.2.1 Analytification ...................................... 5 1.3 Complexes..................................................... 6 1.3.1 Basic Definitions ..................................... 6 1.3.2 Filtrations............................................ 7 1.3.3 Total Complexes and Signs ............................. 8 1.4 Hypercohomology............................................... 9 1.4.1 Definition............................................ 10 1.4.2 Godement Resolutions.................................. 11 1.4.3 Čech Cohomology ...................................... 13 1.5 Simplicial Objects........................................... 15 1.6 Grothendieck Topologies...................................... 20 1.7 Torsors ..................................................... 22 1.7.1 Sheaf-Theoretic Definition ........................... 23 1.7.2 Torsors in the Category of Sets ...................... 24 1.7.3 Torsors in the Category of Schemes (Without Groups)..................................... 27 2 Singular Cohomology.............................................. 31 2.1 Relative Cohomology ......................................... 31 2.2 Singular (Co)homology........................................ 34 2.3 Simplicial Cohomology........................................ 36 2.4 The Künneth Formula and Poincaré Duality .................... 41 2.5 The Basic Lemma............................................. 45 v v* Contents 2.5.1 Formulations of the Basic Lemma........................ 45 2.5.2 Direct Proof of Basic Lemma I ......................... 47 2.5.3 Nori’s Proof of Basic Lemma II......................... 49 2.5.4 Beilinson’s Proof of Basic Lemma II.................... 52 2.5.5 Perverse Sheaves and Artin Vanishing................... 55 2.6 Triangulation of Algebraic Varieties ....................... 59 2.6.1 Semi-algebraic Sets ................................... 60 2.6.2 Semi-algebraic Singular Chains ........................ 66 2.7 Singular Cohomology via the h -Topology ....................... 70 3 Algebraic de Rham Cohomology...................................... 73 3.1 The Smooth Case ............................................ 73 3.1.1 Definition............................................. 73 3.1.2 Functoriality . . ..................................... 76 3.1.3 Cup Product............................................ 77 3.1.4 Change of Base Field................................... 79 3.1.5 Étale Topology......................................... 80 3.1.6 Differentials with Log Poles........................... 81 3.2 The General Case: Via the h-Topology....................... 83 3.3 The General Case: Alternative Approaches...................... 87 3.3.1 Deligne’s Method....................................... 87 3.3.2 Hartshome’s Method .................................... 90 3.3.3 Using Geometric Motives............................. 91 3.3.4 The Case of Divisors with Normal Crossings ........... 94 4 Hoiomorphic de Rham Cohomology.................................... 97 4.1 Hoiomorphic de Rham Cohomology................................. 97 4.1.1 Definition............................................. 97 4.1.2 Hoiomorphic Differentials with Log Poles............... 99 4.1.3 GAGA................................................ 100 4.2 Hoiomorphic de Rham Cohomology via the h -Topology.......... 102 4.2.1 h -Differentials ..................................... 102 4.2.2 Hoiomorphic de Rham Cohomology ....................... 103 4.2.3 GAGA.................................................. 104 5 The Period Isomorphism............................................ 107 5.1 The Category(k, Q)—Vect..................................... 107 5.2 A Triangulated Category.................................... 108 5.3 The Period Isomorphism in the Smooth Case .................. 109 5.4 The General Case (via the h -Topology) ..................... Ill 5.5 The General Case (Deligne’s Method)......................... 113 Contents vii 6 Categories of (Mixed) Motives ...................................... 117 6.1 Pure Motives.................................................. 117 6.2 Geometric Motives . .......................................... 119 6.3 Absolute Hodge Motives........................................ 124 6.4 Mixed Tate Motives ......................................... 129 Part II Nori Motives 7 Nori’s Diagram Category ............................................ 137 7.1 Main Results................................................ 137 7.1.1 Diagrams and Representations ........................ 137 7.1.2 Explicit Construction of the Diagram Category ....... 139 7.1.3 Universal Property: Statement ....................... 140 7.1.4 Discussion of the Tannakian Case .................... 144 7.2 First Properties of the Diagram Category ..................... 145 7.3 The Diagram Category of an Abelian Category................... 149 7.3.1 A Calculus of Tensors................................ 150 7.3.2 Construction of the Equivalence...................... 156 7.3.3 Examples and Applications ........................... 164 7.4 Universal Property of the Diagram Category.................... 165 7.5 The Diagram Category as a Category of Comodules............... 168 7.5.1 Preliminary Discussion............................... 168 7.5.2 Coalgebras and Comodules ............................ 169 8 More on Diagrams.................................................... 177 8.1 Multiplicative Structure...................................... 177 8.2 Localisation.................................................. 188 8.3 Nori’s Rigidity Criterion.................................... 191 8.4 Comparing Fibre Functors...................................... 195 8.4.1 The Space of Comparison Maps ........................ 196 8.4.2 Some Examples ....................................... 201 8.4.3 The Description as Formal Periods.................... 204 9 Nori Motives....................................................... 207 9.1 Essentials of Nori Motives ................................... 207 9.1.1 Definition........................................... 207 9.1.2 Main Results ........................................ 209 9.2 Yoga of Good Pairs............................................ 212 9.2.1 Good Pairs and Good Filtrations ..................... 212 9.2.2 Cech Complexes ...................................... 213 9.2.3 Putting Things Together.............................. 216 9.2.4 Comparing Diagram Categories ........................ 218 yiü Contents 9.3 Tensor Structure .......................................... 220 9.3.1 Collection of Proofs............................... 225 9.4 Artin Motives ............................................. 226 9.5 Change of Fields........................................... 228 10 Weights and Pure Nori Motives .................................... 233 10.1 Comparison Functors.......................................... 233 10.2 Weights and Nori Motives .................................... 236 10.2.1 Andre’s Motives.................................... 237 10.2.2 Weights ........................................... 238 10.3 Tate Motives............................................... 241 Part III Periods 11 Periods of Varieties ............................................... 247 11.1 First Definition ............................................ 247 11.2 Periods for the Category(k, Q)֊֊Vect ........................ 250 11.3 Periods of Algebraic Varieties............................... 253 11.3.1 Definition........................................... 253 11.3.2 First Properties..................................... 255 11.4 The Comparison Theorem....................................... 256 11.5 Periods of Motives .......................................... 258 12 Kontsevich-Zagier Periods .......................................... 261 12.1 Definition .................................................. 261 12.2 Comparison of Definitions of Periods ........................ 265 13 Formal Periods and the Period Conjecture ........................... 273 13.1 Formal Periods and Nori Motives ............................. 273 13.2 The Period Conjecture...................................... 277 13.2.1 Formulation in the Number Field Case ................ 278 13.2.2 Consequences......................................... 279 13.2.3 Special Cases and the Older Literature............... 282 13.2.4 The Function Field Case ............................. 284 13.3 The Case of 0-Dimensional Varieties ......................... 287 Part IV Examples 289 14 Elementary Examples .............................................. 291 14.1 Logarithms .................................................. 291 14.2 More Logarithms............................................ 293 14.3 Quadratic Forms ............................................ 294 14.4 Elliptic Curves............................................. 297 14.5 Periods of 1-Forms on Arbitrary Curves....................... 301 Contents ix 15 Multiple Zeta Values .............................................. 307 15.1 A C՜value, the Basic Example................................ 307 15.2 Definition of Multiple Zeta Values ......................... 310 15.3 Kontsevich’s Integral Representation........................ 312 15.4 Relations Among Multiple Zeta Values........................ 314 15.5 Multiple Zeta Values and Moduli Space of Marked Curves ........................................... 320 15.6 Multiple Polylogarithms .................................. 321 15.6.1 The Configuration .................................. 322 15.6.2 Singular Homology .................................. 323 15.6.3 Smooth Singular Homology............................ 326 15.6.4 Algebraic de Rham Cohomology and the Period Matrix of (.X, D)................................... 327 15.6.5 Varying the Parameters a and b...................... 331 16 Miscellaneous Periods: An Outlook ................................. 337 16.1 Special Values of L-Functions............................... 337 16.2 Feynman Periods............................................. 341 16.3 Algebraic Cycles and Periods ............................... 343 16.4 Periods of Homotopy Groups ................................. 347 16.5 Exponential Periods......................................... 349 16.6 Non-periods................................................. 350 Glossary............................................................... 355 References............................................................. 359 Index.................................................................. 369
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author	Huber, Annette 1967- Müller-Stach, Stefan 1962-
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series	Ergebnisse der Mathematik und ihrer Grenzgebiete. 3. Folge
series2	Ergebnisse der Mathematik und ihrer Grenzgebiete. 3. Folge
spelling	Huber, Annette 1967- (DE-588)172146569 aut Periods and Nori motives Annette Huber, Stefan Müller-Stach ; with contributions by Benjamin Friedrich and Jonas von Wangenheim Cham, Switzerland Springer [2017] © 2017 xxiii, 372 Seiten txt rdacontent n rdamedia nc rdacarrier Ergebnisse der Mathematik und ihrer Grenzgebiete. 3. Folge volume 65 Kohomologie (DE-588)4031700-6 gnd rswk-swf Zahlentheorie (DE-588)4067277-3 gnd rswk-swf Periode (DE-588)4197595-9 gnd rswk-swf Motiv Mathematik (DE-588)4197596-0 gnd rswk-swf Periode (DE-588)4197595-9 s Zahlentheorie (DE-588)4067277-3 s Motiv Mathematik (DE-588)4197596-0 s Kohomologie (DE-588)4031700-6 s DE-604 Müller-Stach, Stefan 1962- (DE-588)111714141 aut Friedrich, Benjamin 1980- (DE-588)130563307 ctb Wangenheim, Jonas von (DE-588)1165244942 ctb Erscheint auch als Online-Ausgabe 978-3-319-50926-6 Ergebnisse der Mathematik und ihrer Grenzgebiete. 3. Folge volume 65 (DE-604)BV000899194 65 Digitalisierung UB Regensburg - ADAM Catalogue Enrichment application/pdf http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=029643981&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA Inhaltsverzeichnis
spellingShingle	Huber, Annette 1967- Müller-Stach, Stefan 1962- Periods and Nori motives Ergebnisse der Mathematik und ihrer Grenzgebiete. 3. Folge Kohomologie (DE-588)4031700-6 gnd Zahlentheorie (DE-588)4067277-3 gnd Periode (DE-588)4197595-9 gnd Motiv Mathematik (DE-588)4197596-0 gnd
subject_GND	(DE-588)4031700-6 (DE-588)4067277-3 (DE-588)4197595-9 (DE-588)4197596-0
title	Periods and Nori motives
title_auth	Periods and Nori motives
title_exact_search	Periods and Nori motives
title_full	Periods and Nori motives Annette Huber, Stefan Müller-Stach ; with contributions by Benjamin Friedrich and Jonas von Wangenheim
title_fullStr	Periods and Nori motives Annette Huber, Stefan Müller-Stach ; with contributions by Benjamin Friedrich and Jonas von Wangenheim
title_full_unstemmed	Periods and Nori motives Annette Huber, Stefan Müller-Stach ; with contributions by Benjamin Friedrich and Jonas von Wangenheim
title_short	Periods and Nori motives
title_sort	periods and nori motives
topic	Kohomologie (DE-588)4031700-6 gnd Zahlentheorie (DE-588)4067277-3 gnd Periode (DE-588)4197595-9 gnd Motiv Mathematik (DE-588)4197596-0 gnd
topic_facet	Kohomologie Zahlentheorie Periode Motiv Mathematik
url	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=029643981&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
volume_link	(DE-604)BV000899194
work_keys_str_mv	AT huberannette periodsandnorimotives AT mullerstachstefan periodsandnorimotives AT friedrichbenjamin periodsandnorimotives AT wangenheimjonasvon periodsandnorimotives

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