Torsors and Rational Points
Torsors and Rational Points
The classical descent on curves of genus one can be interpreted as providing conditions on the set of rational points of an algebraic variety X defined over a number field, viewed as a subset of its adelic points. This is the natural set-up of the Hasse principle and various approximation properties of rational points. The most famous among such conditions is the Manin obstruction exploiting the Brauer-Grothendieck group of X. It emerged recently that a non-abelian generalization of descent sometimes provides stronger conditions on rational points. An all-encompassing 'obstruction' is related to the X-torsors (families of principal homogenous spaces with base X) under algebraic groups. This book, first published in 2001, is a detailed exposition of the general theory of torsors with key examples, the relation of descent to the Manin obstruction, and applications of descent: to conic bundles, to bielliptic surfaces, and to homogenous spaces of algebraic groups.
- Gives complete proofs of fundamental theorems alongside detailed discussions of the key examples
- The first book about the Manin obstruction and applications of torsors to rational points
Reviews & endorsements
'… the book provides an excellent account of the subject for the non-expert.' T. Szamuely, Zentralblatt für Mathematik
'The book is written in a clear and lucid manner with detailed examples that balance the abstract theory with concrete facts. It is reasonably self-contained and can therefore be recommended to newcomers to the recent development of the descent'. EMS
Product details
No date availableAdobe eBook Reader
9780511891649
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Table of Contents
- 1. Introduction
- 2. Torsors: general theory
- 3. Examples of torsors
- 4. Abelian torsors
- 5. Obstructions over number fields
- 6. Abelian descent and Manin obstruction
- 7. Conic bundle surfaces
- 8. Bielliptic surfaces
- 9. Homogenous spaces.
