Book contents
- Frontmatter
- Contents
- Preface
- Acknowledgements
- 1 An introduction to unitary symmetry
- 2 Soft pions
- 3 Dilatations
- 4 Renormalization and symmetry: a review for non-specialists
- 5 Secret symmetry: an introduction to spontaneous symmetry breakdown and gauge fields
- 6 Classical lumps and their quantum descendants
- 7 The uses of instantons
- 8 1/N
4 - Renormalization and symmetry: a review for non-specialists
Published online by Cambridge University Press: 10 November 2010
- Frontmatter
- Contents
- Preface
- Acknowledgements
- 1 An introduction to unitary symmetry
- 2 Soft pions
- 3 Dilatations
- 4 Renormalization and symmetry: a review for non-specialists
- 5 Secret symmetry: an introduction to spontaneous symmetry breakdown and gauge fields
- 6 Classical lumps and their quantum descendants
- 7 The uses of instantons
- 8 1/N
Summary
Introduction
I suppose that as good a way as any of explaining the contents of this lecture is to explain the title. By ‘renormalization’ I mean the removal of infinities for Feynman amplitudes, in perturbation theory, for Lagrangian field theories with polynomial interactions. In particular non-perturbative renormalization (the work of Jaffe, Glimm, etc.) is outside the scope of this lecture, as are the properties of non-polynomial interactions (the work of Efimov, Salam, Lehmann, etc.). By ‘renormalization and symmetry’ I mean that we will be concerned not only with the renormalization of scattering amplitudes, but also with the renormalization of the matrix elements of conserved and partially conserved currents. In particular, we will discuss some fairly recent results of Symanzik, Benjamin Lee, Preparata, Weisberger, and others. By ‘a review for non-specialists’ I mean that I hope that this talk will be intelligible to people who can do nothing more complicated than remove the divergences from the self-energy of the electron.
Since renormalization theory has a well-deserved reputation for complexity, it is obvious that I will be able to do all this in a single lecture only by cheating. To be precise, I will explain a very powerful theorem due to Klaus Hepp, but not prove it (this is the cheat); then I will show how a wide variety of results can be obtained from this master theorem by elementary methods.
- Type
- Chapter
- Information
- Aspects of SymmetrySelected Erice Lectures, pp. 99 - 112Publisher: Cambridge University PressPrint publication year: 1985