Statistical Mechanics'This is an excellent book from which to learn the methods and results of statistical mechanics.' Nature 'A well written graduate-level text for scientists and engineers... Highly recommended for graduate-level libraries.' ChoiceThis highly successful text, which first appeared in the year 1972 and has continued to be popular ever since, has now been brought up-to-date by incorporating the remarkable developments in the field of 'phase transitions and critical phenomena' that took place over the intervening years. This has been done by adding three new chapters (comprising over 150 pages and containing over 60 homework problems) which should enhance the usefulness of the book for both students and instructors. We trust that this classic text, which has been widely acclaimed for its clean derivations and clear explanations, will continue to provide further generations of students a sound training in the methods of statistical physics. |
From inside the book
Results 1-5 of 94
Page v
... classical ideal gas 1.5. The entropy of mixing and the Gibbs paradox 1.6. The “correct” enumeration of the microstates Problems Notes Chapter 2. Elements of Ensemble Theory 2.1. Phase space of a classical system 2.2. Liouville's theorem ...
... classical ideal gas 1.5. The entropy of mixing and the Gibbs paradox 1.6. The “correct” enumeration of the microstates Problems Notes Chapter 2. Elements of Ensemble Theory 2.1. Phase space of a classical system 2.2. Liouville's theorem ...
Page vii
... classical gas 9.2. Virial expansion of the equation of state 9.3. Evaluation of the virial coefficients 9.4. General remarks on cluster expansions 9.5. Exact treatment of the second virial coefficient 9.6. Cluster expansion for a ...
... classical gas 9.2. Virial expansion of the equation of state 9.3. Evaluation of the virial coefficients 9.4. General remarks on cluster expansions 9.5. Exact treatment of the second virial coefficient 9.6. Cluster expansion for a ...
Page xiii
... classical statistics. This message may not be new, but here I have tried to follow it as far as is reasonably possible in a textbook. In doing so, an attempt has been made to keep the level of presentation fairly uniform so that the ...
... classical statistics. This message may not be new, but here I have tried to follow it as far as is reasonably possible in a textbook. In doing so, an attempt has been made to keep the level of presentation fairly uniform so that the ...
Page 5
... classical Maxwell–Boltzmann Statistics comes out transparently in terms of the indistinguishability of the molecules." In the same paper Einstein discovered the phenomenon of Bose–Einstein condensation which, thirteen years later, was ...
... classical Maxwell–Boltzmann Statistics comes out transparently in terms of the indistinguishability of the molecules." In the same paper Einstein discovered the phenomenon of Bose–Einstein condensation which, thirteen years later, was ...
Page 6
... classical theories of Riecke (1898), Drude (1900) and Lorentz (1904–05). Around the same time, Thomas (1927) and ... classical phase space; this was discussed, both from statistical and quantum-mechanical points of view, by Dirac (1929 ...
... classical theories of Riecke (1898), Drude (1900) and Lorentz (1904–05). Around the same time, Thomas (1927) and ... classical phase space; this was discussed, both from statistical and quantum-mechanical points of view, by Dirac (1929 ...
Contents
1 | |
9 | |
30 | |
43 | |
90 | |
104 | |
Chapter 6 The Theory of Simple Gases | 127 |
Chapter 7 Ideal Bose Systems | 157 |
The Method of Quantized Fields | 262 |
Criticality Universality and Scaling | 305 |
Exact or Almost Exact Results for the Various Models | 366 |
The Renormalization Group Approach | 414 |
Chapter 14 Fluctuations | 452 |
Appendixes | 495 |
Bibliography | 513 |
Index | 523 |
Common terms and phrases
Accordingly appearing approach approximation arises assume atoms becomes behavior classical clearly coefficient Comparing complete condition consider constant coordinates correlation corresponding critical defined denotes density dependence derived determined distribution effect electron energy ensemble entropy equal equation equilibrium evaluate expansion expect exponents expression fact factor Fermi field fixed fluctuations follows formula given given system gives hence ideal identical integral interaction lattice leads limit liquid magnetic mean molecules motion nature normal obtain operator parameter particles partition function phase Phys physical positive potential probability problem properties quantity referred region relation relationship represents respectively result Show space specific heat spontaneous magnetization statistics summation temperature theorem theory thermodynamic transformation transition turn variable various volume wave write written zero