Book contents
- Frontmatter
- Contents
- Preface
- 1 A few well-known basic results
- 2 Introduction: order parameters, broken symmetries
- 3 Examples of physical situations modelled by the Ising model
- 4 A few results for the Ising model
- 5 High-temperature and low-temperature expansions
- 6 Some geometric problems related to phase transitions
- 7 Phenomenological description of critical behaviour
- 8 Mean field theory
- 9 Beyond the mean field theory
- 10 Introduction to the renormalization group
- 11 Renormalization group for the φ4 theory
- 12 Renormalized theory
- 13 Goldstone modes
- 14 Large n
- Index
Preface
Published online by Cambridge University Press: 05 July 2014
- Frontmatter
- Contents
- Preface
- 1 A few well-known basic results
- 2 Introduction: order parameters, broken symmetries
- 3 Examples of physical situations modelled by the Ising model
- 4 A few results for the Ising model
- 5 High-temperature and low-temperature expansions
- 6 Some geometric problems related to phase transitions
- 7 Phenomenological description of critical behaviour
- 8 Mean field theory
- 9 Beyond the mean field theory
- 10 Introduction to the renormalization group
- 11 Renormalization group for the φ4 theory
- 12 Renormalized theory
- 13 Goldstone modes
- 14 Large n
- Index
Summary
These lecture notes do not attempt to cover the subject in its full extent. There are several excellent books that go much deeper into renormalization theory, or into the physical applications to critical phenomena and related topics. In writing these notes I did not mean either to cover the more recent and exciting aspects of the subject, such as quantum criticality, two-dimensional conformal invariance, disordered systems, condensed matter applications of the AdS/CFT duality borrowed from string theory, and so on.
A knowledge of the renormalization group and of field theory remains a necessary part of today's physics education. These notes are simply an introduction to the subject. They are based on actual lectures, which I gave at Sun Yat-sen University in Guangzhou in the fall of 2008. In order not to scare the students, I felt that a short text was a better introduction. There are even several parts that can be dropped by a hasty reader, such as GKS inequalities or high-temperature series. However, high-T series lead to an easy way of connecting geometrical criticality, such as self-avoiding walks and polymers or percolation to physics. I have chosen not to use Feynman diagrams; not that I think that they are unnecessary, I have used them for ever. But since I did not want to require a prior exposition to quantum field theory, I would have had to deal with a long detour, going through connected diagrams, one-particle irreducibility, and so on.
- Type
- Chapter
- Information
- Introduction to Statistical Field Theory , pp. ix - xPublisher: Cambridge University PressPrint publication year: 2010