Book contents
- Frontmatter
- Contents
- Acknowledgments
- Notation and conventions
- Introduction
- 1 Twisted Jacobi sums
- 2 Cohomology groups of V = Vmn(c)
- 3 Twisted Fermat motives
- 4 The inductive structure and the Hodge and Newton polygons
- 5 Twisting and the Picard number
- 6 “Brauer numbers” of twisted Fermat motives
- 7 Evaluating Q(V, T) at T = q–r
- 8 The Lichtenbaum–Milne conjecture
- 9 Remarks, observations and open problems
- A Tables
- B How to compute the stable Picard number when m is prime
- Bibliography
- Index
- Titles in the series
7 - Evaluating Q(V, T) at T = q–r
Published online by Cambridge University Press: 12 January 2010
Book contents
- Frontmatter
- Contents
- Acknowledgments
- Notation and conventions
- Introduction
- 1 Twisted Jacobi sums
- 2 Cohomology groups of V = Vmn(c)
- 3 Twisted Fermat motives
- 4 The inductive structure and the Hodge and Newton polygons
- 5 Twisting and the Picard number
- 6 “Brauer numbers” of twisted Fermat motives
- 7 Evaluating Q(V, T) at T = q–r
- 8 The Lichtenbaum–Milne conjecture
- 9 Remarks, observations and open problems
- A Tables
- B How to compute the stable Picard number when m is prime
- Bibliography
- Index
- Titles in the series
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- Arithmetic of Diagonal Hypersurfaces over Finite Fields , pp. 77 - 82Publisher: Cambridge University PressPrint publication year: 1995