Central simple algebras and galois cohomology

Author(s)

Bibliographic Information

Central simple algebras and galois cohomology

Philippe Gille, Tamás Szamuely

(Cambridge studies in advanced mathematics, 101)

Cambridge University Press, 2006

  • : hardback

Available at  / 49 libraries

Search this Book/Journal

Note

Includes bibliographical references (p. [323]-338) and index

Description and Table of Contents

Description

This book is the first comprehensive, modern introduction to the theory of central simple algebras over arbitrary fields. Starting from the basics, it reaches such advanced results as the Merkurjev-Suslin theorem. This theorem is both the 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, but no homological algebra, the book covers the basic theory of central simple algebras, methods of Galois descent and Galois cohomology, Severi-Brauer varieties, residue maps and, finally, Milnor K-theory and K-cohomology. The last chapter rounds off the theory by presenting the results in positive characteristic, including the theorem of Bloch-Gabber-Kato. The book is suitable as a textbook for graduate students and as a reference for researchers working in algebra, algebraic geometry or K-theory.

Table of Contents

  • 1. Quaternion algebras
  • 2. Central simple algebras and Galois descent
  • 3. Techniques from group cohomology
  • 4. The cohomological Brauer group
  • 5. Severi-Brauer varieties
  • 6. Residue maps
  • 7. Milnor K-theory
  • 8. The Merkurjev-Suslin theorem
  • 9. Symbols in positive characteristic
  • Appendix: A breviary of algebraic geometry
  • References
  • Index.

by "Nielsen BookData"

Related Books: 1-1 of 1

Details

  • NCID
    BA77940807
  • ISBN
    • 9780521861038
  • Country Code
    uk
  • Title Language Code
    eng
  • Text Language Code
    eng
  • Place of Publication
    Cambridge, U.K.
  • Pages/Volumes
    ix, 343 p.
  • Size
    24 cm
  • Parent Bibliography ID
Page Top