Book contents
- Frontmatter
- Contents
- Foreword
- Preface
- Notation
- 10 Type I and type II superstrings
- 11 The heterotic string
- 12 Superstring interactions
- 13 D-branes
- 14 Strings at strong coupling
- 15 Advanced CFT
- 16 Orbifolds
- 17 Calabi–Yau compactification
- 18 Physics in four dimensions
- 19 Advanced topics
- Appendix B Spinors and SUSY in various dimensions
- References
- Glossary
- Index
15 - Advanced CFT
Published online by Cambridge University Press: 26 February 2010
- Frontmatter
- Contents
- Foreword
- Preface
- Notation
- 10 Type I and type II superstrings
- 11 The heterotic string
- 12 Superstring interactions
- 13 D-branes
- 14 Strings at strong coupling
- 15 Advanced CFT
- 16 Orbifolds
- 17 Calabi–Yau compactification
- 18 Physics in four dimensions
- 19 Advanced topics
- Appendix B Spinors and SUSY in various dimensions
- References
- Glossary
- Index
Summary
We have encountered a number of infinite-dimensional symmetry algebras on the world-sheet: conformal, superconformal, and current. While we have used these symmetries as needed to obtain specific physical results, in the present chapter we would like to take maximum advantage of them in determining the form of the world-sheet theory. An obvious goal, not yet reached, would be to construct the general conformal or superconformal field theory, corresponding to the general classical string background.
This subject is no longer as central as it once appeared to be, as spacetime rather than world-sheet symmetries have been the principal tools in recent times. However, it is a subject of some beauty in its own right, with various applications to string compactification and also to other areas of physics.
We first discuss the representations of the conformal algebra, and the constraints imposed by conformal invariance on correlation functions. We then study some examples, such as the minimal models, Sugawara and coset theories, where the symmetries do in fact determine the theory completely. We briefly summarize the representation theory of the N = 1 superconformal algebra. We then discuss a framework, rational conformal field theory, which incorporates all these CFTs. To conclude this chapter we present some important results about the relation between conformal field theories and nearby two-dimensional field theories that are not conformally invariant, and the application of CFT in statistical mechanics.
- Type
- Chapter
- Information
- String Theory , pp. 228 - 273Publisher: Cambridge University PressPrint publication year: 1998