Vector bundles in algebraic geometry : Durham, 1993
Author(s)
Bibliographic Information
Vector bundles in algebraic geometry : Durham, 1993
(London Mathematical Society lecture note series, 208)
Cambridge University Press, 1995
- : pbk
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Note
"The 1993 Durham Symposium Vector Bundles in Algebraic Geometry"--Introd
Includes bibliographical references
Description and Table of Contents
Description
The study of vector bundles over algebraic varieties has been stimulated over the last few years by successive waves of migrant concepts, largely from mathematical physics, whilst retaining its roots in old questions concerning subvarieties of projective space. The 1993 Durham Symposium on Vector Bundles in Algebraic Geometry brought together some of the leading researchers in the field to explore further these interactions. This book is a collection of survey articles by the main speakers at the symposium and presents to the mathematical world an overview of the key areas of research involving vector bundles. Topics covered include those linking gauge theory and geometric invariant theory such as augmented bundles and coherent systems; Donaldson invariants of algebraic surfaces; Floer homology and quantum cohomology; conformal field theory and the moduli spaces of bundles on curves; the Horrocks-Mumford bundle and codimension 2 subvarieties in P4 and P5; exceptional bundles and stable sheaves on projective space.
Table of Contents
- 1. On the deformation theory of moduli spaces of vector bundles V. Balaji and P. Vishwanath
- 2. Stable augmented bundles over Riemann surfaces S. Bradlow, G. Daskapoulos, O. Garcia-Pradia and R. Wentworth
- 3. On surfaces in P4 and threefolds in P5 W. Decker and S. Popescu
- 4. Exceptional bundles and moduli spaces of stable sheaves on Pn J. M. Drezet
- 5. Floer homology and algebraic geometry S. Donaldson
- 6. The Horrocks-Mumford bundle K. Hulek
- 7. Faisaux semi-stable et systems coherent J. Le Potier
- 8. Combinatorics of the Verlinde formula A. Szenes
- 9. Canonical and almost canonical spin polynomials of an algebraic surface A. Tyurin
- 10. On conformal field theory K. Ueno.
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