Readership: Mathematical physicists, mathematicians, physics graduate students in statistical mechanics, condensed matter physics, and quantum field theory. Also chemists with an interest in phyical chemistry and quantum chemistry, and computer scientists with an interest in symbolic computation.
Barry M McCoy, Institute for Theoretical Physics, State University of New York, Stony Brook
1: Basic Principles 2: Reductionism, Phenomena and Models 3: Stability, Existence and Uniqueness 4: Theorems on Order 5: Critical Phenomena and Scaling Theory 6: Mayer Virial Expansions and Groenevelt's Theorems 7: Ree-Hoover Virial Expansion and Hard Spheres 8: High Density Expansions 9: High Temperature Expansions for Magnets at H=0 10: The Ising Model in Two Dimensions; Summary of Results 11: The Pfaffian Solution of the Ising Model 12: Ising Model Spontaneous Magnetization, Form Factors and Susceptibility 13: The Star-Triangle (Yang-Baxter) Equation 14: The Eight Vertex and XYZ models 15: The RSOS and the Chiral Potts models 16: Conclusion
