Book contents
- Frontmatter
- Contents
- Preface
- 1 Gibbs states and Markov random fields
- 2 Interacting particle systems
- 3 Coupled Markov chains
- 4 Gibbs states and Markov random fields on countable graphs
- 5 Gibbs states on countable sets
- 6 Kirkwood–Salsburg equations
- 7 Involutions of P(S)
- 8 Attractive and supermodular potentials
- 9 Attractive pair potentials
- 10 Examples of phase transition
- 11 11 The extreme points of GV
- Appendix The Lee-Yang circle theorem revisited
- Bibliography
- Index
- Frontmatter
- Contents
- Preface
- 1 Gibbs states and Markov random fields
- 2 Interacting particle systems
- 3 Coupled Markov chains
- 4 Gibbs states and Markov random fields on countable graphs
- 5 Gibbs states on countable sets
- 6 Kirkwood–Salsburg equations
- 7 Involutions of P(S)
- 8 Attractive and supermodular potentials
- 9 Attractive pair potentials
- 10 Examples of phase transition
- 11 11 The extreme points of GV
- Appendix The Lee-Yang circle theorem revisited
- Bibliography
- Index
Summary
- Type
- Chapter
- Information
- Gibbs States on Countable Sets , pp. 127 - 128Publisher: Cambridge University PressPrint publication year: 1974