Book contents
- Frontmatter
- Contents
- 1 Introduction
- 2 Quantum field theory
- 3 Basic examples
- 4 Dimensional regularization
- 5 Renormalization
- 6 Composite operators
- 7 Renormalization group
- 8 Large-mass expansion
- 9 Global symmetries
- 10 Operator-product expansion
- 11 Coordinate space
- 12 Renormalization of gauge theories
- 13 Anomalies
- 14 Deep-inelastic scattering
- References
- Index
12 - Renormalization of gauge theories
Published online by Cambridge University Press: 10 March 2010
- Frontmatter
- Contents
- 1 Introduction
- 2 Quantum field theory
- 3 Basic examples
- 4 Dimensional regularization
- 5 Renormalization
- 6 Composite operators
- 7 Renormalization group
- 8 Large-mass expansion
- 9 Global symmetries
- 10 Operator-product expansion
- 11 Coordinate space
- 12 Renormalization of gauge theories
- 13 Anomalies
- 14 Deep-inelastic scattering
- References
- Index
Summary
It is important to show that renormalization of a gauge theory can be accomplished without violating its gauge invariance. Gauge invariance is physically important; among other things it is used (via the Ward identities) to show that the unphysical states decouple ('t Hooft (1971a)).
In Chapter 9 we considered the case that the basic Lagrangian of a theory is invariant under a global symmetry, as opposed to a gauge symmetry, such as we will be investigating in this chapter. We showed that the counterterm Lagrangian is also invariant under the symmetry. Suppose now that the basic Lagrangian is invariant under a gauge symmetry. One might suppose that the counterterms are also invariant under the symmetry, just as for a global symmetry. This is not true, however, since the introduction of gauge fixing (as explained in Sections 2.12 and 2.13) destroys manifest gauge invariance of the Lagrangian. One might instead point out that the theory with gauge fixing is BRS invariant and deduce that the counterterms are BRS invariant. This deduction is false. To see this, we recall that an ordinary internal symmetry relates Green's functions with certain external fields to other Green's functions differing only by change of symmetry labels. However, BRS symmetry relates a field to a composite field (2.13.1).
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- Chapter
- Information
- RenormalizationAn Introduction to Renormalization, the Renormalization Group and the Operator-Product Expansion, pp. 293 - 330Publisher: Cambridge University PressPrint publication year: 1984