Book contents
- Frontmatter
- Contents
- Preface
- Introduction
- 1 An Introduction to Affine Lie Algebras and the Associated Groups
- 2 Space of Vacua and its Propagation
- 3 Factorization Theorem for Space of Vacua
- 4 Fusion Ring and Explicit Verlinde Formula
- 5 Moduli Stack of Quasi-parabolic G-Bundles and its Uniformization
- 6 Parabolic G-Bundles and Equivariant G-Bundles
- 7 Moduli Space of Semistable G-Bundles Over a Smooth Curve
- 8 Identification of the Space of Conformal Blocks with the Space of Generalized Theta Functions
- 9 Picard Group of Moduli Space of G-Bundles
- Appendix A Dynkin Index
- Appendix B C-Space and C-Group Functors
- Appendix C Algebraic Stacks
- Appendix D Rank-Level Duality (A Brief Survey) (by Swarnava Mukhopadhyay)
- Bibliography
- Index
4 - Fusion Ring and Explicit Verlinde Formula
Published online by Cambridge University Press: 19 November 2021
- Frontmatter
- Contents
- Preface
- Introduction
- 1 An Introduction to Affine Lie Algebras and the Associated Groups
- 2 Space of Vacua and its Propagation
- 3 Factorization Theorem for Space of Vacua
- 4 Fusion Ring and Explicit Verlinde Formula
- 5 Moduli Stack of Quasi-parabolic G-Bundles and its Uniformization
- 6 Parabolic G-Bundles and Equivariant G-Bundles
- 7 Moduli Space of Semistable G-Bundles Over a Smooth Curve
- 8 Identification of the Space of Conformal Blocks with the Space of Generalized Theta Functions
- 9 Picard Group of Moduli Space of G-Bundles
- Appendix A Dynkin Index
- Appendix B C-Space and C-Group Functors
- Appendix C Algebraic Stacks
- Appendix D Rank-Level Duality (A Brief Survey) (by Swarnava Mukhopadhyay)
- Bibliography
- Index
Summary
As mentioned in Chapter 3, to determine the dimension of the space of vacua on a genus-g curve, it suffices to determine it on the projective line with three marked points. To achieve this, a general algebraic framework in the form of a fusion ring of the simple Lie algebra g at level c is introduced in this chapter. It is a finite rank-reduced algebra. We determine its set of characters explicitly by using the combinatorics of the affine Weyl group and the affine analogue of the Borel--Weil--Bott theorem, as well as a Lie algebra cohomology vanishing result of Teleman. Once we have explicitly determined the characters of the fusion ring (as we have), one of the most important results of the book -- the Verlinde dimension formula -- follows easily by using simple representation theory for finite groups.
Keywords
- Type
- Chapter
- Information
- Publisher: Cambridge University PressPrint publication year: 2021