Book contents
- Frontmatter
- Contents
- PREFACE TO VOLUME II
- NOTATION
- 15 NON-ABELIAN GAUGE THEORIES
- 16 EXTERNAL FIELD METHODS
- 17 RENORMALIZATION OF GAUGE THEORIES
- 18 RENORMALIZATION GROUP METHODS
- 19 SPONTANEOUSLY BROKEN GLOBAL SYMMETRIES
- 20 OPERATOR PRODUCT EXPANSIONS
- 21 SPONTANEOUSLY BROKEN GAUGE SYMMETRIES
- 22 ANOMALIES
- 23 EXTENDED FIELD CONFIGURATIONS
- AUTHOR INDEX
- SUBJECT INDEX
16 - EXTERNAL FIELD METHODS
Published online by Cambridge University Press: 05 May 2013
- Frontmatter
- Contents
- PREFACE TO VOLUME II
- NOTATION
- 15 NON-ABELIAN GAUGE THEORIES
- 16 EXTERNAL FIELD METHODS
- 17 RENORMALIZATION OF GAUGE THEORIES
- 18 RENORMALIZATION GROUP METHODS
- 19 SPONTANEOUSLY BROKEN GLOBAL SYMMETRIES
- 20 OPERATOR PRODUCT EXPANSIONS
- 21 SPONTANEOUSLY BROKEN GAUGE SYMMETRIES
- 22 ANOMALIES
- 23 EXTENDED FIELD CONFIGURATIONS
- AUTHOR INDEX
- SUBJECT INDEX
Summary
It is often useful to consider quantum field theories in the presence of a classical external field. One reason is that in many physical situations, there really is an external field present, such as a classical electromagnetic or gravitational field, or a scalar field with a non-vanishing vacuum expectation value. (As we shall see in Chapter 19, such scalar fields can play an important role in the spontaneous breakdown of symmetries of the Lagrangian.) But even where there is no actual external field present in a problem, some calculations are greatly facilitated by considering physical amplitudes in the presence of a fictitious external field. This chapter will show that it is possible to take all multiloop effects into account by summing ‘tree’ graphs whose vertices and propagators are taken from a quantum effective action, which is nothing but the one-particle-irreducible connected vacuum-vacuum amplitude in the presence of an external field. It will turn out in the next chapter that this provides an especially handy way both of completing the proof of the renormalizabilty of non-Abelian gauge theories begun in Chapter 15, and of calculating the charge renormalization factors that we need in order to establish the crucial property of asymptotic freedom in quantum chromodynamics.
The Quantum Effective Action
Consider a quantum field theory with action I[ϕ], and suppose we ‘turn on’ a set of classical currents Jr(x) coupled to the fields ϕr(x) of the theory.
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- The Quantum Theory of Fields , pp. 63 - 79Publisher: Cambridge University PressPrint publication year: 1996
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