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Central Simple Algebras and Galois Cohomology 2nd Revised edition [Kietas viršelis]

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  • Formatas: Hardback, 430 pages, aukštis x plotis x storis: 235x158x28 mm, weight: 720 g, Worked examples or Exercises
  • Serija: Cambridge Studies in Advanced Mathematics
  • Išleidimo metai: 10-Aug-2017
  • Leidėjas: Cambridge University Press
  • ISBN-10: 1107156378
  • ISBN-13: 9781107156371
Kitos knygos pagal šią temą:
Central Simple Algebras and Galois Cohomology 2nd Revised editionDidesnis paveikslėlis
  • Formatas: Hardback, 430 pages, aukštis x plotis x storis: 235x158x28 mm, weight: 720 g, Worked examples or Exercises
  • Serija: Cambridge Studies in Advanced Mathematics
  • Išleidimo metai: 10-Aug-2017
  • Leidėjas: Cambridge University Press
  • ISBN-10: 1107156378
  • ISBN-13: 9781107156371
Kitos knygos pagal šią temą:
Pastovi nuoroda: https://www.kriso.lt/db/9781107156371.html
Raktažodžiai:
The first comprehensive, modern introduction to the theory of central simple algebras over arbitrary fields, this book starts from the basics and reaches such advanced results as the Merkurjev–Suslin theorem, a culmination of work initiated by Brauer, Noether, Hasse and Albert, and the starting point of current research in motivic cohomology theory by Voevodsky, Suslin, Rost and others. Assuming only a solid background in algebra, the text covers the basic theory of central simple algebras, methods of Galois descent and Galois cohomology, Severi–Brauer varieties, and techniques in Milnor K-theory and K-cohomology, leading to a full proof of the Merkurjev–Suslin theorem and its application to the characterization of reduced norms. The final chapter rounds off the theory by presenting the results in positive characteristic, including the theorems of Bloch–Gabber–Kato and Izhboldin. This second edition has been carefully revised and updated, and contains important additional topics.

The first comprehensive, modern introduction to a central field in modern algebra with connections to algebraic geometry, K-theory, and number theory. It proceeds from the basics to more advanced results, including the Merkurjev–Suslin theorem. It is ideal as a text for a graduate course and as a reference for researchers.

Daugiau informacijos

The first comprehensive modern introduction to central simple algebra starting from the basics and reaching advanced results.
Preface ix
1 Quaternion algebras
1(18)
1.1 Basic properties
1(3)
1.2 Splitting over a quadratic extension
4(3)
1.3 The associated conic
7(3)
1.4 A theorem of Witt
10(3)
1.5 Tensor products of quaternion algebras
13(6)
2 Central simple algebras and Galois descent
19(51)
2.1 Wedderburn's theorem
19(3)
2.2 Splitting fields
22(5)
2.3 Galois descent
27(6)
2.4 The Brauer group
33(3)
2.5 Cyclic algebras
36(6)
2.6 Reduced norms and traces
42(5)
2.7 A basic exact sequence and applications
47(5)
2.8 Index and period
52(7)
2.9 Central simple algebras over complete discretely valued fields
59(2)
2.10 K1 of central simple algebras
61(9)
3 Techniques from group cohomology
70(35)
3.1 Definition of cohomology groups
70(7)
3.2 Explicit resolutions
77(5)
3.3 Relation to subgroups
82(10)
3.4 Cup-products
92(13)
4 The cohomological Brauer group
105(34)
4.1 Profinite groups and Galois groups
105(6)
4.2 Cohomology of profinite groups
111(7)
4.3 The cohomology exact sequence
118(5)
4.4 The Brauer group revisited
123(4)
4.5 Another characterization of the index
127(3)
4.6 The Galois symbol
130(3)
4.7 Cyclic algebras and symbols
133(6)
5 Severi--Brauer varieties
139(24)
5.1 Basic properties
140(2)
5.2 Classification by Galois cohomology
142(5)
5.3 Geometric Brauer equivalence
147(5)
5.4 Amitsur's theorem
152(7)
5.5 An application: making central simple algebras cyclic
159(4)
6 Residue maps
163(52)
6.1 Cohomological dimension
163(7)
6.2 C1-fields
170(7)
6.3 Cohomology of complete discretely valued fields
177(5)
6.4 Cohomology of function fields of curves
182(5)
6.5 Application to class field theory
187(3)
6.6 Application to the rationality problem: the method
190(7)
6.7 Application to the rationality problem: the example
197(5)
6.8 Residue maps with finite coefficients
202(6)
6.9 The Faddeev sequence with finite coefficients
208(7)
7 Milnor K-theory
215(43)
7.1 The tame symbol
215(7)
7.2 Milnor's exact sequence and the Bass--Tate lemma
222(6)
7.3 The norm map
228(9)
7.4 Reciprocity laws
237(6)
7.5 Applications to the Galois symbol
243(6)
7.6 The Galois symbol over number fields
249(9)
8 The Merkurjev--Suslin theorem
258(58)
8.1 Gersten complexes in Milnor K-theory
259(4)
8.2 Properties of Gersten complexes
263(5)
8.3 A property of Severi--Brauer varieties
268(7)
8.4 Hilbert's Theorem 90 for K2
275(8)
8.5 The Merkurjev--Suslin theorem: a special case
283(5)
8.6 The Merkurjev--Suslin theorem: the general case
288(8)
8.7 Reduced norms and K2-symbols
296(6)
8.8 A useful exact sequence
302(8)
8.9 Reduced norms and cohomology
310(6)
9 Symbols in positive characteristic
316(51)
9.1 The theorems of Teichmuller and Albert
317(8)
9.2 Differential forms and p-torsion in the Brauer group
325(4)
9.3 Logarithmic differentials and flat p-connections
329(7)
9.4 Decomposition of the de Rham complex
336(4)
9.5 The Bloch--Gabber--Kato theorem: statement and reductions
340(5)
9.6 Surjectivity of the differential symbol
345(6)
9.7 Injectivity of the differential symbol
351(8)
9.8 Application to p-torsion in Milnor K-theory
359(8)
Appendix: a breviary of algebraic geometry 367(27)
Bibliography 394(19)
Index 413
Philippe Gille is a Research Director for Centre National de la Recherche Scientifique at Institut Camille Jordan, Lyon. He has written numerous research papers on linear algebraic groups and related structures. Tamįs Szamuely is a Research Advisor at the Alfréd Rényi Institute of Mathematics of the Hungarian Academy of Sciences, Budapest and a Professor at the Central European University, Hungary. He is the author of Galois Groups and Fundamental Groups (Cambridge, 2009), also published in the Cambridge Studies in Advanced Mathematics series, as well as numerous research papers.