Lectures on vector bundles
Author(s)
Bibliographic Information
Lectures on vector bundles
(Cambridge studies in advanced mathematics, 54)
Cambridge University Press, 1997
Available at 69 libraries
Note
"Transferred to digital printing 2004"--T.p. verso of 2004 printing
Includes bibliographical references (p. 245-248) and index
Description and Table of Contents
Description
This work consists of two courses on the moduli spaces of vector bundles. The first part tackles the classification of vector bundles on algebraic curves. The construction and elementary properties of the moduli spaces of stable bundles are also discussed. In particular, Hilbert-Grothendieck schemes of vector bundles are constructed, and Mumford's geometric invariant theory is succinctly treated. The second part centres on the structure of the moduli space of semi-stable sheaves on the projective plane. Existence conditions for sheaves of given rank and Chern Class and construction ideas are sketched in the general context of projective algebraic surfaces. Professor Le Potier has provided a treatment of vector bundles that will be welcomed by experienced algebraic geometers and novices alike.
Table of Contents
- Part I. Vector Bundles On Algebraic Curves: 1. Generalities
- 2. The Riemann-Roch formula
- 3. Topological
- 4. The Hilbert scheme
- 5. Semi-stability
- 6. Invariant geometry
- 7. The construction of M(r,d)
- 8. Study of M(r,d)
- Part II. Moduli Spaces Of Semi-Stable Sheaves On The Projective Plane
- 9. Introduction
- 10. Operations on semi-stable sheaves
- 11. Restriction to curves
- 12. Bogomolov's theorem
- 13. Bounded families
- 14. The construction of the moduli space
- 15. Differential study of the Shatz stratification
- 16. The conditions for existence
- 17. The irreducibility
- 18. The Picard group
- Bibliography.
by "Nielsen BookData"