Book contents
- Frontmatter
- Contents
- Preface
- 1 Thermostatics
- 2 Statistical entropy and Boltzmann distribution
- 3 Canonical and grand canonical ensembles: applications
- 4 Critical phenomena
- 5 Quantum statistics
- 6 Irreversible processes: macroscopic theory
- 7 Numerical simulations
- 8 Irreversible processes: kinetic theory
- 9 Topics in non-equilibrium statistical mechanics
- Appendix
- References
- Index
Preface
Published online by Cambridge University Press: 03 December 2009
- Frontmatter
- Contents
- Preface
- 1 Thermostatics
- 2 Statistical entropy and Boltzmann distribution
- 3 Canonical and grand canonical ensembles: applications
- 4 Critical phenomena
- 5 Quantum statistics
- 6 Irreversible processes: macroscopic theory
- 7 Numerical simulations
- 8 Irreversible processes: kinetic theory
- 9 Topics in non-equilibrium statistical mechanics
- Appendix
- References
- Index
Summary
This book attempts to give at a graduate level a self-contained, thorough and pedagogic exposition of the topics that, we believe, are most fundamental in modern statistical thermodynamics. It follows a balanced approach between the macroscopic (thermodynamic) and microscopic (statistical) points of view.
The first half of the book covers equilibrium phenomena. We start with a thermodynamic approach in the first chapter, in the spirit of Callen, and we introduce the concepts of equilibrium statistical mechanics in the second chapter, deriving the Boltzmann–Gibbs distribution in the canonical and grand canonical ensembles. Numerous applications are given in the third chapter, in cases where the effects of quantum statistics can be neglected: ideal and non-ideal classical gases, magnetism, equipartition theorem, diatomic molecules and first order phase transitions. The fourth chapter deals with continuous phase transitions. We give detailed accounts of symmetry breaking, discrete and continuous, of mean field theory and of the renormalization group and we illustrate the theoretical concepts with many concrete examples. Chapter 5 is devoted to quantum statistics and to the discussion of many physical examples: Fermi gas, black body radiation, phonons and Bose–Einstein condensation including gaseous atomic condensates.
Chapter 6 offers an introduction to macroscopic non-equilibrium phenomena. We carefully define the notion of local equilibrium and the transport coefficients together with their symmetry properties (Onsager). Hydrodynamics of simple fluids is used as an illustration. Chapter 7 is an introduction to numerical methods, in which we describe in some detail the main Monte Carlo algorithms.
- Type
- Chapter
- Information
- Equilibrium and Non-Equilibrium Statistical Thermodynamics , pp. xv - xviPublisher: Cambridge University PressPrint publication year: 2004