An introduction to invariants and moduli
Author(s)
Bibliographic Information
An introduction to invariants and moduli
(Cambridge studies in advanced mathematics, 81)
Cambridge University Press, 2003
- Other Title
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モジュライ理論
Mojurai riron
Available at / 60 libraries
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Science and Technology Library, Kyushu University
: hardback411.8/Mu 24031212010001255,
023212003003857 -
Tokyo University of Agriculture and Technology Koganei Library
: hardback411.860745028,
41160416158 -
Hokkaido University, Library, Graduate School of Science, Faculty of Science and School of Science数学
: hardback/M 8962080255306
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Note
Includes bibliographical references (p. 487-493) and index
Description and Table of Contents
Description
Incorporated in this 2003 volume are the first two books in Mukai's series on moduli theory. The notion of a moduli space is central to geometry. However, its influence is not confined there; for example, the theory of moduli spaces is a crucial ingredient in the proof of Fermat's last theorem. Researchers and graduate students working in areas ranging from Donaldson or Seiberg-Witten invariants to more concrete problems such as vector bundles on curves will find this to be a valuable resource. Amongst other things this volume includes an improved presentation of the classical foundations of invarant theory that, in addition to geometers, would be useful to those studying representation theory. This translation gives an accurate account of Mukai's influential Japanese texts.
Table of Contents
- 1. Invariants and moduli
- 2. Rings and polynomials
- 3. Algebraic varieties
- 4. Algebraic groups and rings of invariants
- 5. Construction of quotient spaces
- 6. Global construction of quotient varieties
- 7. Grassmannians and vector bundles
- 8. Curves and their Jacobians
- 9. Stable vector bundles on curves
- 10. Moduli functors
- 11. Intersection numbers and the Verlinde formula
- 12. The numerical criterion and its applications.
by "Nielsen BookData"